Datasets:

SunnyLin
/

FormalGeo7k_v1

id int32 1 6.98k	annotation stringclasses 132 values	source stringlengths 7 17	problem_level int32 0 28	problem_text_cn stringlengths 20 201	problem_text_en stringlengths 58 424	problem_img stringlengths 5 8	construction_cdl listlengths 1 28	text_cdl listlengths 0 16	image_cdl listlengths 0 16	goal_cdl stringlengths 8 131	problem_answer stringclasses 906 values	theorem_seqs listlengths 0 28	theorem_seqs_dag_json stringlengths 13 3.3k
1	XiaokaiZhang_2023-03-12	Geometry3k-0	1	如图所示，三角形RST与三角形XYZ是全等三角形，TR=x+21，ZX=2x-14，∠TRS=4y-10°，∠ZXY=3*y+5°。求y的值。	As shown in the diagram, triangle RST is congruent to triangle XYZ, TR=x+21, ZX=2x-14, ∠TRS=4y-10°, ∠ZXY=3*y+5°. Find the value of y.	1.png	[ "Shape(RS,ST,TR)", "Shape(XY,YZ,ZX)" ]	[ "CongruentBetweenTriangle(RST,XYZ)", "Equal(LengthOfLine(TR),x+21)", "Equal(LengthOfLine(ZX),2x-14)", "Equal(MeasureOfAngle(TRS),4y-10)", "Equal(MeasureOfAngle(ZXY),3*y+5)" ]	[ "Equal(LengthOfLine(TR),x+21)", "Equal(LengthOfLine(ZX),2x-14)", "Equal(MeasureOfAngle(TRS),4y-10)", "Equal(MeasureOfAngle(ZXY),3*y+5)" ]	Value(y)	15	[ "congruent_triangle_property_angle_equal(1,RST,XYZ)" ]	{"START": ["congruent_triangle_property_angle_equal(1,RST,XYZ)"]}
2	XiaokaiZhang_2023-04-02	Geometry3k-1	1	如图所示，MN=3x-4，NQ=15，PN=2y+5，PQ=12，RM=18，RP=20，RQ=3*z-3，∠MRQ=38°，∠NQP=83°，∠QNM=33°，RM和PN是▱MRPN的一组对边。求y的值。	As shown in the diagram, MN=3x-4, NQ=15, PN=2y+5, PQ=12, RM=18, RP=20, RQ=3*z-3, ∠MRQ=38°, ∠NQP=83°, ∠QNM=33°, MN and RP are opposite sides of the ▱ MRPN. Find the value of y.	2.png	[ "Shape(MR,RQ,QM)", "Shape(QR,RP,PQ)", "Shape(MQ,QN,NM)", "Shape(QP,PN,NQ)", "Collinear(MQP)", "Collinear(RQN)" ]	[ "Equal(LengthOfLine(MN),3x-4)", "Equal(LengthOfLine(NQ),15)", "Equal(LengthOfLine(PN),2y+5)", "Equal(LengthOfLine(PQ),12)", "Equal(LengthOfLine(RM),18)", "Equal(LengthOfLine(RP),20)", "Equal(LengthOfLine(RQ),3*z-3)", "Equal(MeasureOfAngle(MRQ),38)", "Equal(MeasureOfAngle(NQP),83)", "Equal(Measur...	[ "Equal(LengthOfLine(MN),3x-4)", "Equal(LengthOfLine(NQ),15)", "Equal(LengthOfLine(PN),2y+5)", "Equal(LengthOfLine(PQ),12)", "Equal(LengthOfLine(RM),18)", "Equal(LengthOfLine(RP),20)", "Equal(LengthOfLine(RQ),3*z-3)", "Equal(MeasureOfAngle(MRQ),38)", "Equal(MeasureOfAngle(NQP),83)", "Equal(Measur...	Value(y)	13/2	[ "parallelogram_property_opposite_line_equal(1,MRPN)" ]	{"START": ["parallelogram_property_opposite_line_equal(1,MRPN)"]}
3	XiaokaiZhang_2023-04-02	Geometry3k-2	3	如图所示，BT=SB，QA=RA，QT=86，RS=54，JK是四边形AQTB的中位线。求直线JK的长度。	As shown in the diagram, BT=SB, QA=RA, QT=86, RS=54, the midsegment of quadrilateral AQTB is JK. Find the length of line JK.	3.png	[ "Shape(RA,AB,BS,SR)", "Shape(AJ,JK,KB,BA)", "Shape(JQ,QT,TK,KJ)", "Collinear(RAJQ)", "Collinear(SBKT)" ]	[ "Equal(LengthOfLine(BT),LengthOfLine(SB))", "Equal(LengthOfLine(QA),LengthOfLine(RA))", "Equal(LengthOfLine(QT),86)", "Equal(LengthOfLine(RS),54)", "IsMidsegmentOfQuadrilateral(JK,AQTB)" ]	[ "Equal(LengthOfLine(BT),LengthOfLine(SB))", "Equal(LengthOfLine(QA),LengthOfLine(RA))", "Equal(LengthOfLine(QT),86)", "Equal(LengthOfLine(RS),54)" ]	Value(LengthOfLine(JK))	78	[ "midsegment_of_quadrilateral_judgment_midpoint(1,AB,RQTS)", "midsegment_of_quadrilateral_property_length(1,AB,RQTS)", "midsegment_of_quadrilateral_property_length(1,JK,AQTB)" ]	{"START": ["midsegment_of_quadrilateral_judgment_midpoint(1,AB,RQTS)", "midsegment_of_quadrilateral_property_length(1,JK,AQTB)"], "midsegment_of_quadrilateral_judgment_midpoint(1,AB,RQTS)": ["midsegment_of_quadrilateral_property_length(1,AB,RQTS)"]}
4	XiaokaiZhang_2023-04-02	Geometry3k-3	1	如图所示，WZ=23，XY=23，∠ZWX=112°，XW平行于YZ，XY和ZW是梯形XYZW的腰。求∠YZW的大小。	As shown in the diagram, WZ=23, XY=23, ∠ZWX=112°, XW is parallel to YZ, XYZW is a trapezoid. Find the measure of ∠YZW.	4.png	[ "Shape(WX,XY,YZ,ZW)" ]	[ "Equal(LengthOfLine(WZ),23)", "Equal(LengthOfLine(XY),23)", "Equal(MeasureOfAngle(ZWX),112)", "ParallelBetweenLine(XW,YZ)", "Trapezoid(XYZW)" ]	[ "Equal(LengthOfLine(WZ),23)", "Equal(LengthOfLine(XY),23)", "Equal(MeasureOfAngle(ZWX),112)", "ParallelBetweenLine(XW,YZ)" ]	Value(MeasureOfAngle(YZW))	68	[ "parallel_property_ipsilateral_internal_angle(1,ZY,WX)" ]	{"START": ["parallel_property_ipsilateral_internal_angle(1,ZY,WX)"]}
5	XiaokaiZhang_2023-03-12	Geometry3k-4	3	如图所示，AB=y，AD=z，BC=x，BD=4，CD=10，AB⊥CB，DC垂直于AC。求x的值。	As shown in the diagram, AB=y, AD=z, BC=x, BD=4, CD=10, AB⊥CB, DC⊥AC. Find the value of x.	5.png	[ "Shape(CA,AB,BC)", "Shape(CB,BD,DC)", "Collinear(ABD)" ]	[ "Equal(LengthOfLine(AB),y)", "Equal(LengthOfLine(AD),z)", "Equal(LengthOfLine(BC),x)", "Equal(LengthOfLine(BD),4)", "Equal(LengthOfLine(CD),10)", "PerpendicularBetweenLine(AB,CB)", "PerpendicularBetweenLine(DC,AC)" ]	[ "Equal(LengthOfLine(AB),y)", "Equal(LengthOfLine(AD),z)", "Equal(LengthOfLine(BC),x)", "Equal(LengthOfLine(BD),4)", "Equal(LengthOfLine(CD),10)", "PerpendicularBetweenLine(AB,CB)", "PerpendicularBetweenLine(DC,AC)" ]	Value(x)	2*sqrt(21)	[ "adjacent_complementary_angle(1,ABC,CBD)", "right_triangle_judgment_angle(1,CBD)", "right_triangle_property_pythagorean(1,CBD)" ]	{"START": ["adjacent_complementary_angle(1,ABC,CBD)"], "adjacent_complementary_angle(1,ABC,CBD)": ["right_triangle_judgment_angle(1,CBD)"], "right_triangle_judgment_angle(1,CBD)": ["right_triangle_property_pythagorean(1,CBD)"]}
6	XiaokaiZhang_2023-03-12	Geometry3k-5	6	如图所示，AC=20，CM=12，MB=30，CM⊥AM。求三角形AMB的周长。	As shown in the diagram, AC=20, CM=12, MB=30, CM is perpendicular to AM. Find the perimeter of △AMB.	6.png	[ "Shape(AC,CM,MA)", "Shape(AM,MB,BA)", "Collinear(CMB)" ]	[ "Equal(LengthOfLine(AC),20)", "Equal(LengthOfLine(CM),12)", "Equal(LengthOfLine(MB),30)", "PerpendicularBetweenLine(CM,AM)" ]	[ "Equal(LengthOfLine(AC),20)", "Equal(LengthOfLine(CM),12)", "Equal(LengthOfLine(MB),30)", "PerpendicularBetweenLine(CM,AM)" ]	Value(PerimeterOfTriangle(AMB))	80	[ "adjacent_complementary_angle(1,CMA,AMB)", "right_triangle_judgment_angle(1,CMA)", "right_triangle_judgment_angle(1,AMB)", "right_triangle_property_pythagorean(1,CMA)", "right_triangle_property_pythagorean(1,AMB)", "triangle_perimeter_formula(1,AMB)" ]	{"START": ["adjacent_complementary_angle(1,CMA,AMB)", "right_triangle_judgment_angle(1,CMA)", "triangle_perimeter_formula(1,AMB)"], "adjacent_complementary_angle(1,CMA,AMB)": ["right_triangle_judgment_angle(1,AMB)"], "right_triangle_judgment_angle(1,AMB)": ["right_triangle_property_pythagorean(1,AMB)"], "right_triangle_judgment_angle(1,CMA)": ["right_triangle_property_pythagorean(1,CMA)"]}
7	XiaokaiZhang_2023-03-12	Geometry3k-6	3	如图所示，TR=7sqrt(2)，TS=3sqrt(2)，RS垂直于TS。求∠STR的大小。	As shown in the diagram, TR=7sqrt(2), TS=3sqrt(2), RS is perpendicular to TS. Find the measure of ∠STR.	7.png	[ "Shape(TR,RS,ST)" ]	[ "Equal(LengthOfLine(TR),7sqrt(2))", "Equal(LengthOfLine(TS),3sqrt(2))", "PerpendicularBetweenLine(RS,TS)" ]	[ "Equal(LengthOfLine(TR),7sqrt(2))", "Equal(LengthOfLine(TS),3sqrt(2))", "PerpendicularBetweenLine(RS,TS)" ]	Value(MeasureOfAngle(STR))	180asin(2sqrt(10)/7)/pi	[ "right_triangle_judgment_angle(1,RST)", "right_triangle_property_pythagorean(1,RST)", "sine_theorem(1,RST)" ]	{"START": ["right_triangle_judgment_angle(1,RST)", "sine_theorem(1,RST)"], "right_triangle_judgment_angle(1,RST)": ["right_triangle_property_pythagorean(1,RST)"]}
8	XiaokaiZhang_2023-03-12	Geometry3k-7	2	如图所示，AB=4/7，AC=x，BC=5/7，BA垂直于CA。求x的值。	As shown in the diagram, AB=4/7, AC=x, BC=5/7, BA⊥CA. Find the value of x.	8.png	[ "Shape(AC,CB,BA)" ]	[ "Equal(LengthOfLine(AB),4/7)", "Equal(LengthOfLine(AC),x)", "Equal(LengthOfLine(BC),5/7)", "PerpendicularBetweenLine(BA,CA)" ]	[ "Equal(LengthOfLine(AB),4/7)", "Equal(LengthOfLine(AC),x)", "Equal(LengthOfLine(BC),5/7)", "PerpendicularBetweenLine(BA,CA)" ]	Value(x)	3/7	[ "right_triangle_judgment_angle(1,BAC)", "right_triangle_property_pythagorean(1,BAC)" ]	{"START": ["right_triangle_judgment_angle(1,BAC)"], "right_triangle_judgment_angle(1,BAC)": ["right_triangle_property_pythagorean(1,BAC)"]}
9	XiaokaiZhang_2023-04-02	Geometry3k-8	11	如图所示，JK=10，MN=16，⌒KMN的角度为98，⊙K的圆心为K，MP垂直于KP。求直线LN的长度。	As shown in the diagram, JK=10, MN=16, the measure of ⌒KMN is 98, the center of circle K is K, MP⊥KP. Find the length of line LN.	9.png	[ "Shape(KJM,MK,KJ)", "Shape(MP,PK,KM)", "Shape(KML,LP,PM)", "Shape(PL,LN,NP)", "Shape(KLN,NL)", "Shape(PN,KNJ,JK,KP)", "Collinear(JKPL)", "Collinear(MPN)", "Cocircular(K,JMLN)" ]	[ "Equal(LengthOfLine(JK),10)", "Equal(LengthOfLine(MN),16)", "Equal(MeasureOfArc(KMN),98)", "IsCentreOfCircle(K,K)", "PerpendicularBetweenLine(MP,KP)" ]	[ "Equal(LengthOfLine(JK),10)", "IsCentreOfCircle(K,K)", "PerpendicularBetweenLine(MP,KP)" ]	Value(LengthOfLine(LN))	4*sqrt(5)	[ "circle_property_chord_perpendicular_bisect_chord(1,K,KP,MN)", "line_addition(1,MP,PN)", "radius_of_circle_property_length_equal(1,KJ,K)", "radius_of_circle_property_length_equal(1,KM,K)", "radius_of_circle_property_length_equal(1,KL,K)", "right_triangle_judgment_angle(1,MPK)", "right_triangle_property_...	{"START": ["circle_property_chord_perpendicular_bisect_chord(1,K,KP,MN)", "line_addition(1,MP,PN)", "radius_of_circle_property_length_equal(1,KJ,K)", "radius_of_circle_property_length_equal(1,KM,K)", "radius_of_circle_property_length_equal(1,KL,K)", "right_triangle_judgment_angle(1,MPK)", "line_addition(1,LP,PK)", "vertical_angle(1,MPK,NPL)"], "right_triangle_judgment_angle(1,MPK)": ["right_triangle_property_pythagorean(1,MPK)"], "right_triangle_judgment_angle(1,NPL)": ["right_triangle_property_pythagorean(1,NPL)"], "vertical_angle(1,MPK,NPL)": ["right_triangle_judgment_angle(1,NPL)"]}
10	XiaokaiZhang_2023-04-02	Geometry3k-9	1	如图所示，∠FCD=x°，弧EDB的角度为10*x，弧EFD的角度为40，圆O的切线为CD。求x的值。	As shown in the diagram, ∠FCD=x°, the measure of arc EDB is 10*x, the measure of arc EFD is 40, CD is the tangent to circle E. Find the value of x.	10.png	[ "Shape(EDB,BF,EFD)", "Shape(CD,EFD,FC)", "Shape(FB,EBF)", "Collinear(BFC)", "Cocircular(E,FDB)" ]	[ "Equal(MeasureOfAngle(FCD),x)", "Equal(MeasureOfArc(EDB),10*x)", "Equal(MeasureOfArc(EFD),40)", "IsTangentOfCircle(CD,E)" ]	[ "Equal(MeasureOfAngle(FCD),x)", "Equal(MeasureOfArc(EDB),10*x)", "Equal(MeasureOfArc(EFD),40)" ]	Value(x)	5	[ "circle_property_circular_power_tangent_and_segment_angle(2,CD,CFB,E)" ]	{"START": ["circle_property_circular_power_tangent_and_segment_angle(2,CD,CFB,E)"]}
11	XiaokaiZhang_2023-03-12	Geometry3k-10	1	如图所示，∠CFK=28°，∠GKF=35°，∠KAC=25°，∠KHC=51°，EG⊥FG，HC垂直于KC，KF垂直于EF。求∠FEK的大小。	As shown in the diagram, ∠CFK=28°, ∠GKF=35°, ∠KAC=25°, ∠KHC=51°, EG is perpendicular to FG, HC is perpendicular to KC, KF is perpendicular to EF. Find the measure of ∠FEK.	11.png	[ "Shape(KA,AH,HK)", "Shape(KH,HC,CK)", "Shape(KC,CF,FK)", "Shape(KF,FG,GK)", "Shape(GF,FE,EG)", "Collinear(AHCF)", "Collinear(EGK)" ]	[ "Equal(MeasureOfAngle(CFK),28)", "Equal(MeasureOfAngle(GKF),35)", "Equal(MeasureOfAngle(KAC),25)", "Equal(MeasureOfAngle(KHC),51)", "PerpendicularBetweenLine(EG,FG)", "PerpendicularBetweenLine(HC,KC)", "PerpendicularBetweenLine(KF,EF)" ]	[ "Equal(MeasureOfAngle(CFK),28)", "Equal(MeasureOfAngle(GKF),35)", "Equal(MeasureOfAngle(KAC),25)", "Equal(MeasureOfAngle(KHC),51)", "PerpendicularBetweenLine(EG,FG)", "PerpendicularBetweenLine(HC,KC)", "PerpendicularBetweenLine(KF,EF)" ]	Value(MeasureOfAngle(FEK))	55	[ "triangle_property_angle_sum(1,FEK)" ]	{"START": ["triangle_property_angle_sum(1,FEK)"]}
12	XiaokaiZhang_2023-04-02	Geometry3k-11	8	如图所示，AB=30，CD=30，⌒XCZ的角度为40，⊙X的圆心为X，AM垂直于YM，DN⊥ZN。求弧XBA的角度。	As shown in the diagram, AB=30, CD=30, the measure of arc XCZ is 40, the center of ⊙X is X, AM is perpendicular to YM, DN⊥ZN. Find the measure of arc XBA.	12.png	[ "Shape(XBY,YM,MB)", "Shape(XYA,AM,MY)", "Shape(XM,MA,XAC,CN,NX)", "Shape(NC,XCZ,ZN)", "Shape(NZ,XZD,DN)", "Shape(MX,XN,ND,XDB,BM)", "Collinear(AMB)", "Collinear(YMX)", "Collinear(XNZ)", "Collinear(CND)", "Cocircular(X,ACZDBY)" ]	[ "Equal(LengthOfLine(AB),30)", "Equal(LengthOfLine(CD),30)", "Equal(MeasureOfArc(XCZ),40)", "IsCentreOfCircle(X,X)", "PerpendicularBetweenLine(AM,YM)", "PerpendicularBetweenLine(DN,ZN)" ]	[ "Equal(LengthOfLine(AB),30)", "Equal(LengthOfLine(CD),30)", "Equal(MeasureOfArc(XCZ),40)", "IsCentreOfCircle(X,X)", "PerpendicularBetweenLine(AM,YM)", "PerpendicularBetweenLine(DN,ZN)" ]	Value(MeasureOfArc(XBA))	80	[ "vertical_angle(1,CNX,DNZ)", "circle_property_chord_perpendicular_bisect_arc(1,XCD,XNZ)", "arc_addition_length(1,XCZ,XZD)", "similar_arc_judgment_cocircular(1,XCZ,XCD)", "similar_arc_property_length_ratio(1,XCZ,XCD)", "similar_arc_property_measure_ratio(1,XCZ,XCD)", "congruent_arc_judgment_chord_equal(1...	{"START": ["vertical_angle(1,CNX,DNZ)", "arc_addition_length(1,XCZ,XZD)", "similar_arc_judgment_cocircular(1,XCZ,XCD)", "congruent_arc_judgment_chord_equal(1,XCD,XBA)"], "congruent_arc_judgment_chord_equal(1,XCD,XBA)": ["congruent_arc_property_measure_equal(1,XCD,XBA)"], "similar_arc_judgment_cocircular(1,XCZ,XCD)": ["similar_arc_property_length_ratio(1,XCZ,XCD)", "similar_arc_property_measure_ratio(1,XCZ,XCD)"], "vertical_angle(1,CNX,DNZ)": ["circle_property_chord_perpendicular_bisect_arc(1,XCD,XNZ)"]}
13	XiaokaiZhang_2023-04-02	Geometry3k-12	3	如图所示，AB=5，BD=x，CA=15/2，EC=9/2。求x的值。	As shown in the diagram, AB=5, BD=x, CA=15/2, EC=9/2. Find the value of x.	13.png	[ "Shape(XDB,BD)", "Shape(BA,AC,XBC)", "Shape(DB,XBC,CE,XED)", "Shape(XCE,EC)", "Collinear(ABXD)", "Collinear(ACE)", "Cocircular(X,BCED)" ]	[ "Equal(LengthOfLine(AB),5)", "Equal(LengthOfLine(BD),x)", "Equal(LengthOfLine(CA),15/2)", "Equal(LengthOfLine(EC),9/2)" ]	[ "Equal(LengthOfLine(AB),5)", "Equal(LengthOfLine(BD),x)", "Equal(LengthOfLine(CA),15/2)", "Equal(LengthOfLine(EC),9/2)" ]	Value(x)	13	[ "circle_property_circular_power_segment_and_segment_line(1,ABD,ACE,X)", "line_addition(1,AB,BD)", "line_addition(1,AC,CE)" ]	{"START": ["circle_property_circular_power_segment_and_segment_line(1,ABD,ACE,X)", "line_addition(1,AB,BD)", "line_addition(1,AC,CE)"]}
14	XiaokaiZhang_2023-04-02	Geometry3k-13	1	如图所示，AJ=2x+3，CJ=8y-36，JB=5x，JD=4y，AD和CB是▱ACBD的一组对边。求y的值。	As shown in the diagram, AJ=2x+3, CJ=8y-36, JB=5x, JD=4y, quadrilateral ACBD is a parallelogram. Find the value of y.	14.png	[ "Shape(AC,CJ,JA)", "Shape(JC,CB,BJ)", "Shape(AJ,JD,DA)", "Shape(JB,BD,DJ)", "Collinear(AJB)", "Collinear(CJD)" ]	[ "Equal(LengthOfLine(AJ),2x+3)", "Equal(LengthOfLine(CJ),8y-36)", "Equal(LengthOfLine(JB),5x)", "Equal(LengthOfLine(JD),4y)", "Parallelogram(ACBD)" ]	[ "Equal(LengthOfLine(AJ),2x+3)", "Equal(LengthOfLine(CJ),8y-36)", "Equal(LengthOfLine(JB),5x)", "Equal(LengthOfLine(JD),4y)" ]	Value(y)	9	[ "parallelogram_property_diagonal_bisection(1,CBDA,J)" ]	{"START": ["parallelogram_property_diagonal_bisection(1,CBDA,J)"]}
15	XiaokaiZhang_2023-04-02	Geometry3k-14	4	如图所示，IB=1/2x-7，JI=1/4x+5，LD=66-2/3y，NL=1/3y-6，NL=LD，CJ⊥NJ，IB⊥DB，JI垂直于LI。求x的值。	As shown in the diagram, IB=1/2x-7, JI=1/4x+5, LD=66-2/3y, NL=1/3y-6, NL=LD, CJ⊥NJ, IB is perpendicular to DB, JI is perpendicular to LI. Find the value of x.	15.png	[ "Shape(JI,IL,LN,NJ)", "Shape(IB,BD,DL,LI)", "Shape(CJ,JN)", "Collinear(CJIB)", "Collinear(NLD)" ]	[ "Equal(LengthOfLine(IB),1/2x-7)", "Equal(LengthOfLine(JI),1/4x+5)", "Equal(LengthOfLine(LD),66-2/3y)", "Equal(LengthOfLine(NL),1/3y-6)", "Equal(LengthOfLine(NL),LengthOfLine(LD))", "PerpendicularBetweenLine(CJ,NJ)", "PerpendicularBetweenLine(IB,DB)", "PerpendicularBetweenLine(JI,LI)" ]	[ "Equal(LengthOfLine(IB),1/2x-7)", "Equal(LengthOfLine(JI),1/4x+5)", "Equal(LengthOfLine(LD),66-2/3y)", "Equal(LengthOfLine(NL),1/3y-6)", "Equal(LengthOfLine(NL),LengthOfLine(LD))", "PerpendicularBetweenLine(CJ,NJ)", "PerpendicularBetweenLine(IB,DB)", "PerpendicularBetweenLine(JI,LI)" ]	Value(x)	48	[ "parallel_judgment_corresponding_angle(1,JN,BD,C)", "trapezoid_judgment_parallel(1,JBDN)", "parallel_judgment_corresponding_angle(1,IL,BD,J)", "midsegment_of_quadrilateral_judgment_parallel(3,IL,JBDN)" ]	{"START": ["parallel_judgment_corresponding_angle(1,JN,BD,C)", "parallel_judgment_corresponding_angle(1,IL,BD,J)"], "parallel_judgment_corresponding_angle(1,IL,BD,J)": ["midsegment_of_quadrilateral_judgment_parallel(3,IL,JBDN)"], "parallel_judgment_corresponding_angle(1,JN,BD,C)": ["trapezoid_judgment_parallel(1,JBDN)"], "trapezoid_judgment_parallel(1,JBDN)": ["midsegment_of_quadrilateral_judgment_parallel(3,IL,JBDN)"]}
16	XiaokaiZhang_2023-03-12	Geometry3k-15	1	如图所示，AB=10，AC=y，BC=x，∠ABC=60°，BC垂直于AC。求y的值。	As shown in the diagram, AB=10, AC=y, BC=x, ∠ABC=60°, BC is perpendicular to AC. Find the value of y.	16.png	[ "Shape(AB,BC,CA)" ]	[ "Equal(LengthOfLine(AB),10)", "Equal(LengthOfLine(AC),y)", "Equal(LengthOfLine(BC),x)", "Equal(MeasureOfAngle(ABC),60)", "PerpendicularBetweenLine(BC,AC)" ]	[ "Equal(LengthOfLine(AB),10)", "Equal(LengthOfLine(AC),y)", "Equal(LengthOfLine(BC),x)", "Equal(MeasureOfAngle(ABC),60)", "PerpendicularBetweenLine(BC,AC)" ]	Value(y)	5*sqrt(3)	[ "sine_theorem(1,ABC)" ]	{"START": ["sine_theorem(1,ABC)"]}
17	XiaokaiZhang_2023-04-02	Geometry3k-16	5	如图所示，AB=8，AD=27，AE=12，CD平行于BE。求直线BC的长度。	As shown in the diagram, AB=8, AD=27, AE=12, CD is parallel to BE. Find the length of line BC.	17.png	[ "Shape(CB,BE,ED,DC)", "Shape(BA,AE,EB)", "Collinear(ABC)", "Collinear(AED)" ]	[ "Equal(LengthOfLine(AB),8)", "Equal(LengthOfLine(AD),27)", "Equal(LengthOfLine(AE),12)", "ParallelBetweenLine(CD,BE)" ]	[ "ParallelBetweenLine(CD,BE)" ]	Value(LengthOfLine(BC))	10	[ "parallel_property_corresponding_angle(1,EB,DC,A)", "similar_triangle_judgment_aa(1,BAE,CAD)", "similar_triangle_property_line_ratio(1,BAE,CAD)", "similar_triangle_property_line_ratio(1,EBA,DCA)", "line_addition(1,AB,BC)" ]	{"START": ["parallel_property_corresponding_angle(1,EB,DC,A)", "line_addition(1,AB,BC)"], "parallel_property_corresponding_angle(1,EB,DC,A)": ["similar_triangle_judgment_aa(1,BAE,CAD)"], "similar_triangle_judgment_aa(1,BAE,CAD)": ["similar_triangle_property_line_ratio(1,BAE,CAD)", "similar_triangle_property_line_ratio(1,EBA,DCA)"]}
18	XiaokaiZhang_2023-04-02	Geometry3k-17	1	如图所示，∠NMQ=10x°，∠PNM=20x°，∠PNM=∠MQP，∠QPN=∠NMQ，四边形MQPN是平行四边形。求∠MQP的大小。	As shown in the diagram, ∠NMQ=10x°, ∠PNM=20x°, ∠PNM=∠MQP, ∠QPN=∠NMQ, MQPN is a parallelogram. Find the measure of ∠MQP.	18.png	[ "Shape(MQ,QP,PN,NM)" ]	[ "Equal(MeasureOfAngle(NMQ),10x)", "Equal(MeasureOfAngle(PNM),20x)", "Equal(MeasureOfAngle(PNM),MeasureOfAngle(MQP))", "Equal(MeasureOfAngle(QPN),MeasureOfAngle(NMQ))", "Parallelogram(MQPN)" ]	[ "Equal(MeasureOfAngle(PNM),MeasureOfAngle(MQP))", "Equal(MeasureOfAngle(QPN),MeasureOfAngle(NMQ))" ]	Value(MeasureOfAngle(MQP))	120	[ "parallel_property_ipsilateral_internal_angle(1,NP,MQ)" ]	{"START": ["parallel_property_ipsilateral_internal_angle(1,NP,MQ)"]}
19	XiaokaiZhang_2023-04-02	Geometry3k-18	1	如图所示，AB=4x-17，CD=2x-1，∠BCD=4y-19°，∠CBA=3y+3°，AB和CD是▱ACDB的一组对边。求y的值。	As shown in the diagram, AB=4x-17, CD=2x-1, ∠BCD=4y-19°, ∠CBA=3y+3°, quadrilateral ACDB is a ▱. Find the value of y.	19.png	[ "Shape(AC,CB,BA)", "Shape(BC,CD,DB)" ]	[ "Equal(LengthOfLine(AB),4x-17)", "Equal(LengthOfLine(CD),2x-1)", "Equal(MeasureOfAngle(BCD),4y-19)", "Equal(MeasureOfAngle(CBA),3y+3)", "Parallelogram(ACDB)" ]	[ "Equal(LengthOfLine(AB),4x-17)", "Equal(LengthOfLine(CD),2x-1)", "Equal(MeasureOfAngle(BCD),4y-19)", "Equal(MeasureOfAngle(CBA),3y+3)" ]	Value(y)	22	[ "parallel_property_alternate_interior_angle(2,AB,CD)" ]	{"START": ["parallel_property_alternate_interior_angle(2,AB,CD)"]}
20	XiaokaiZhang_2023-03-12	Geometry3k-19	4	如图所示，AE=BE，BA=8，BC=8，BE=CE，DA=10，DC=10，∠ADE=x°，DE垂直于AE。求sin(x)。	As shown in the diagram, AE=BE, BA=8, BC=8, BE=CE, DA=10, DC=10, ∠ADE=x°, DE⊥AE. Find sin(x).	20.png	[ "Shape(AD,DE,EA)", "Shape(AE,EB,BA)", "Shape(ED,DC,CE)", "Shape(BE,EC,CB)", "Collinear(DEB)", "Collinear(AEC)" ]	[ "Equal(LengthOfLine(AE),LengthOfLine(BE))", "Equal(LengthOfLine(BA),8)", "Equal(LengthOfLine(BC),8)", "Equal(LengthOfLine(BE),LengthOfLine(CE))", "Equal(LengthOfLine(DA),10)", "Equal(LengthOfLine(DC),10)", "Equal(MeasureOfAngle(ADE),x)", "PerpendicularBetweenLine(DE,AE)" ]	[ "Equal(LengthOfLine(AE),LengthOfLine(BE))", "Equal(LengthOfLine(BA),8)", "Equal(LengthOfLine(BC),8)", "Equal(LengthOfLine(BE),LengthOfLine(CE))", "Equal(LengthOfLine(DA),10)", "Equal(LengthOfLine(DC),10)", "Equal(MeasureOfAngle(ADE),x)", "PerpendicularBetweenLine(DE,AE)" ]	Value(Sin(x))	2*sqrt(2)/5	[ "adjacent_complementary_angle(1,DEA,AEB)", "right_triangle_judgment_angle(1,AEB)", "right_triangle_property_pythagorean(1,AEB)", "sine_theorem(1,ADE)" ]	{"START": ["adjacent_complementary_angle(1,DEA,AEB)", "sine_theorem(1,ADE)"], "adjacent_complementary_angle(1,DEA,AEB)": ["right_triangle_judgment_angle(1,AEB)"], "right_triangle_judgment_angle(1,AEB)": ["right_triangle_property_pythagorean(1,AEB)"]}
21	XiaokaiZhang_2023-04-02	Geometry3k-20	1	如图所示，∠ABX=5y-6°，∠BXC=2x+24°，∠CAB=3*x-17°，∠XCA=y+58°，BA和XC是▱ABXC的一组对边。求y的值。	As shown in the diagram, ∠ABX=5y-6°, ∠BXC=2x+24°, ∠CAB=3*x-17°, ∠XCA=y+58°, BA and XC are opposite sides of the ▱ ABXC. Find the value of y.	21.png	[ "Shape(AB,BX,XC,CA)" ]	[ "Equal(MeasureOfAngle(ABX),5y-6)", "Equal(MeasureOfAngle(BXC),2x+24)", "Equal(MeasureOfAngle(CAB),3*x-17)", "Equal(MeasureOfAngle(XCA),y+58)", "Parallelogram(ABXC)" ]	[ "Equal(MeasureOfAngle(ABX),5y-6)", "Equal(MeasureOfAngle(BXC),2x+24)", "Equal(MeasureOfAngle(CAB),3*x-17)", "Equal(MeasureOfAngle(XCA),y+58)" ]	Value(y)	16	[ "parallelogram_property_opposite_angle_equal(1,BXCA)" ]	{"START": ["parallelogram_property_opposite_angle_equal(1,BXCA)"]}
22	XiaokaiZhang_2023-04-02	Geometry3k-21	3	如图所示，∠NJK=101°，JA∥NF。求∠HNJ的大小。	As shown in the diagram, ∠NJK=101°, JA is parallel to NF. Find the measure of ∠HNJ.	22.png	[ "Shape(KJ,JE)", "Shape(EJ,JA)", "Shape(AJ,JN)", "Shape(NJ,JK)", "Shape(HN,NJ)", "Shape(JN,NF)", "Shape(FN,NI)", "Shape(IN,NH)", "Collinear(KJA)", "Collinear(HNF)", "Collinear(EJNI)" ]	[ "Equal(MeasureOfAngle(NJK),101)", "ParallelBetweenLine(JA,NF)" ]	[ "ParallelBetweenLine(JA,NF)" ]	Value(MeasureOfAngle(HNJ))	79	[ "parallel_property_collinear_extend(1,JA,NF,K)", "parallel_property_collinear_extend(2,FN,JK,H)", "parallel_property_ipsilateral_internal_angle(1,NH,JK)" ]	{"START": ["parallel_property_collinear_extend(1,JA,NF,K)"], "parallel_property_collinear_extend(1,JA,NF,K)": ["parallel_property_collinear_extend(2,FN,JK,H)"], "parallel_property_collinear_extend(2,FN,JK,H)": ["parallel_property_ipsilateral_internal_angle(1,NH,JK)"]}
23	XiaokaiZhang_2023-03-12	Geometry3k-23	0	如图所示，SR=3x-5，TR=2x+7，TS=22，∠RST和∠STR是等腰△RST的底角。求直线RS的长度。	As shown in the diagram, SR=3x-5, TR=2x+7, TS=22, RS and RT are the legs of the isosceles △ RST. Find the length of line RS.	23.png	[ "Shape(RS,ST,TR)" ]	[ "Equal(LengthOfLine(SR),3x-5)", "Equal(LengthOfLine(TR),2x+7)", "Equal(LengthOfLine(TS),22)", "IsoscelesTriangle(RST)" ]	[ "Equal(LengthOfLine(SR),3x-5)", "Equal(LengthOfLine(TR),2x+7)", "Equal(LengthOfLine(TS),22)" ]	Value(LengthOfLine(RS))	31	[]	{"START": []}
24	XiaokaiZhang_2023-04-02	Geometry3k-24	1	如图所示，YX=24，YZ=28，∠XWZ=105°，WX和ZY是平行四边形WZYX的一组对边。求∠WZY的大小。	As shown in the diagram, YX=24, YZ=28, ∠XWZ=105°, quadrilateral WZYX is a ▱. Find the measure of ∠WZY.	24.png	[ "Shape(WZ,ZY,YX,XW)" ]	[ "Equal(LengthOfLine(YX),24)", "Equal(LengthOfLine(YZ),28)", "Equal(MeasureOfAngle(XWZ),105)", "Parallelogram(WZYX)" ]	[ "Equal(LengthOfLine(YX),24)", "Equal(LengthOfLine(YZ),28)", "Equal(MeasureOfAngle(XWZ),105)" ]	Value(MeasureOfAngle(WZY))	75	[ "parallel_property_ipsilateral_internal_angle(1,WX,ZY)" ]	{"START": ["parallel_property_ipsilateral_internal_angle(1,WX,ZY)"]}
25	XiaokaiZhang_2023-03-12	Geometry3k-25	3	如图所示，AB=x，AD=3*sqrt(3)，BD=9，CD=y，∠ABC=30°，∠BCA=60°，AD⊥CD，CA垂直于BA。求x的值。	As shown in the diagram, AB=x, AD=3*sqrt(3), BD=9, CD=y, ∠ABC=30°, ∠BCA=60°, AD is perpendicular to CD, CA is perpendicular to BA. Find the value of x.	25.png	[ "Shape(CA,AD,DC)", "Shape(DA,AB,BD)", "Collinear(BDC)" ]	[ "Equal(LengthOfLine(AB),x)", "Equal(LengthOfLine(AD),3*sqrt(3))", "Equal(LengthOfLine(BD),9)", "Equal(LengthOfLine(CD),y)", "Equal(MeasureOfAngle(ABC),30)", "Equal(MeasureOfAngle(BCA),60)", "PerpendicularBetweenLine(AD,CD)", "PerpendicularBetweenLine(CA,BA)" ]	[ "Equal(LengthOfLine(AB),x)", "Equal(LengthOfLine(AD),3*sqrt(3))", "Equal(LengthOfLine(BD),9)", "Equal(LengthOfLine(CD),y)", "Equal(MeasureOfAngle(ABC),30)", "Equal(MeasureOfAngle(BCA),60)", "PerpendicularBetweenLine(AD,CD)", "PerpendicularBetweenLine(CA,BA)" ]	Value(x)	6*sqrt(3)	[ "adjacent_complementary_angle(1,BDA,ADC)", "triangle_property_angle_sum(1,BDA)", "sine_theorem(1,BDA)" ]	{"START": ["adjacent_complementary_angle(1,BDA,ADC)", "triangle_property_angle_sum(1,BDA)", "sine_theorem(1,BDA)"]}
26	XiaokaiZhang_2023-03-12	Geometry3k-26	2	如图所示，AB=y，AC=x，BC=18，∠ABC=30°，CA⊥BA。求y的值。	As shown in the diagram, AB=y, AC=x, BC=18, ∠ABC=30°, CA is perpendicular to BA. Find the value of y.	26.png	[ "Shape(AB,BC,CA)" ]	[ "Equal(LengthOfLine(AB),y)", "Equal(LengthOfLine(AC),x)", "Equal(LengthOfLine(BC),18)", "Equal(MeasureOfAngle(ABC),30)", "PerpendicularBetweenLine(CA,BA)" ]	[ "Equal(LengthOfLine(AB),y)", "Equal(LengthOfLine(AC),x)", "Equal(LengthOfLine(BC),18)", "Equal(MeasureOfAngle(ABC),30)", "PerpendicularBetweenLine(CA,BA)" ]	Value(y)	9*sqrt(3)	[ "triangle_property_angle_sum(1,ABC)", "sine_theorem(1,BCA)" ]	{"START": ["triangle_property_angle_sum(1,ABC)", "sine_theorem(1,BCA)"]}
27	XiaokaiZhang_2023-04-02	Geometry3k-27	4	如图所示，圆H的直径为18，LM=12，⌒HML的角度为84，⊙H的圆心为H，MP垂直于HP。求⌒HKL的角度。	As shown in the diagram, the diameter of ⊙H is 18, LM=12, the measure of ⌒HML is 84, H is the center of circle H, MP⊥HP. Find the measure of ⌒HKL.	27.png	[ "Shape(HLJ,JH,HP,PL)", "Shape(HJM,MP,PH,HJ)", "Shape(HMK,KP,PM)", "Shape(HKL,LP,PK)", "Collinear(JHPK)", "Collinear(LPM)", "Cocircular(H,JMKL)" ]	[ "Equal(DiameterOfCircle(H),18)", "Equal(LengthOfLine(LM),12)", "Equal(MeasureOfArc(HML),84)", "IsCentreOfCircle(H,H)", "PerpendicularBetweenLine(MP,HP)" ]	[ "IsCentreOfCircle(H,H)", "PerpendicularBetweenLine(MP,HP)" ]	Value(MeasureOfArc(HKL))	42	[ "circle_property_chord_perpendicular_bisect_arc(1,HML,HPK)", "congruent_arc_judgment_length_equal(1,HMK,HKL)", "congruent_arc_property_measure_equal(1,HMK,HKL)", "arc_addition_measure(1,HMK,HKL)" ]	{"START": ["circle_property_chord_perpendicular_bisect_arc(1,HML,HPK)", "arc_addition_measure(1,HMK,HKL)"], "circle_property_chord_perpendicular_bisect_arc(1,HML,HPK)": ["congruent_arc_judgment_length_equal(1,HMK,HKL)"], "congruent_arc_judgment_length_equal(1,HMK,HKL)": ["congruent_arc_property_measure_equal(1,HMK,HKL)"]}
28	XiaokaiZhang_2023-04-02	Geometry3k-28	2	如图所示，∠CHE=9x-11°，∠GDF=8x+4°，BD∥EH。求x的值。	As shown in the diagram, ∠CHE=9x-11°, ∠GDF=8x+4°, BD is parallel to EH. Find the value of x.	28.png	[ "Shape(GD,DF)", "Shape(FD,DH)", "Shape(DH,HA)", "Shape(AH,HC)", "Shape(CH,HE)", "Shape(EH,HD)", "Shape(HD,DB)", "Shape(BD,DG)", "Collinear(GDHC)", "Collinear(FDB)", "Collinear(AHE)" ]	[ "Equal(MeasureOfAngle(CHE),9x-11)", "Equal(MeasureOfAngle(GDF),8x+4)", "ParallelBetweenLine(BD,EH)" ]	[ "Equal(MeasureOfAngle(CHE),9x-11)", "Equal(MeasureOfAngle(GDF),8x+4)" ]	Value(x)	15	[ "vertical_angle(1,GDF,HDB)", "parallel_property_corresponding_angle(1,HE,DB,C)" ]	{"START": ["vertical_angle(1,GDF,HDB)", "parallel_property_corresponding_angle(1,HE,DB,C)"]}
29	XiaokaiZhang_2023-03-12	Geometry3k-29	1	如图所示，RS=5，TR=6，TS=3，∠SRT=x°。求x的值。	As shown in the diagram, RS=5, TR=6, TS=3, ∠SRT=x°. Find the value of x.	29.png	[ "Shape(SR,RT,TS)" ]	[ "Equal(LengthOfLine(RS),5)", "Equal(LengthOfLine(TR),6)", "Equal(LengthOfLine(TS),3)", "Equal(MeasureOfAngle(SRT),x)" ]	[ "Equal(LengthOfLine(RS),5)", "Equal(LengthOfLine(TR),6)", "Equal(LengthOfLine(TS),3)", "Equal(MeasureOfAngle(SRT),x)" ]	Value(x)	180*acos(13/15)/pi	[ "cosine_theorem(1,RTS)" ]	{"START": ["cosine_theorem(1,RTS)"]}
30	XiaokaiZhang_2023-04-02	Geometry3k-30	2	如图所示，四边形BLAN的面积为72，CDEF的面积为50，BN=6，CF=x，CDEF相似于BLAN。求x的值。	As shown in the diagram, the area of BLAN is 72, the area of quadrilateral CDEF is 50, BN=6, CF=x, CDEF is similar to BLAN. Find the value of x.	30.png	[ "Shape(CD,DE,EF,FC)", "Shape(BL,LA,AN,NB)" ]	[ "Equal(AreaOfQuadrilateral(BLAN),72)", "Equal(AreaOfQuadrilateral(CDEF),50)", "Equal(LengthOfLine(BN),6)", "Equal(LengthOfLine(CF),x)", "SimilarBetweenQuadrilateral(CDEF,BLAN)" ]	[ "Equal(AreaOfQuadrilateral(BLAN),72)", "Equal(AreaOfQuadrilateral(CDEF),50)", "Equal(LengthOfLine(BN),6)", "Equal(LengthOfLine(CF),x)" ]	Value(x)	5	[ "similar_quadrilateral_property_area_square_ratio(1,CDEF,BLAN)", "similar_quadrilateral_property_line_ratio(1,FCDE,NBLA)" ]	{"START": ["similar_quadrilateral_property_area_square_ratio(1,CDEF,BLAN)", "similar_quadrilateral_property_line_ratio(1,FCDE,NBLA)"]}
31	XiaokaiZhang_2023-04-02	Geometry3k-31	2	如图所示，∠ACD=x°，∠ECA=2*x°，∠GCE=x°。求x的值。	As shown in the diagram, ∠ACD=x°, ∠ECA=2*x°, ∠GCE=x°. Find the value of x.	31.png	[ "Shape(GC,CE)", "Shape(EC,CA)", "Shape(GC,CA)", "Shape(EC,CD)", "Shape(AC,CD)", "Collinear(GCD)" ]	[ "Equal(MeasureOfAngle(ACD),x)", "Equal(MeasureOfAngle(ECA),2*x)", "Equal(MeasureOfAngle(GCE),x)" ]	[ "Equal(MeasureOfAngle(ACD),x)", "Equal(MeasureOfAngle(ECA),2*x)", "Equal(MeasureOfAngle(GCE),x)" ]	Value(x)	45	[ "angle_addition(1,GCE,ECA)", "adjacent_complementary_angle(1,GCA,ACD)" ]	{"START": ["angle_addition(1,GCE,ECA)", "adjacent_complementary_angle(1,GCA,ACD)"]}
32	XiaokaiZhang_2023-04-02	Geometry3k-32	1	如图所示，∠DFH=4x°，∠HFA=2x-6°。求∠DFH的大小。	As shown in the diagram, ∠DFH=4x°, ∠HFA=2x-6°. Find the measure of ∠DFH.	32.png	[ "Shape(DF,FH)", "Shape(HF,FA)", "Shape(AF,FB)", "Shape(BF,FD)", "Collinear(DFA)", "Collinear(BFH)" ]	[ "Equal(MeasureOfAngle(DFH),4x)", "Equal(MeasureOfAngle(HFA),2x-6)" ]	[]	Value(MeasureOfAngle(DFH))	124	[ "adjacent_complementary_angle(1,DFH,HFA)" ]	{"START": ["adjacent_complementary_angle(1,DFH,HFA)"]}
33	XiaokaiZhang_2023-04-02	Geometry3k-33	0	如图所示，AB=2x+3，BC=5x，ADCB是菱形。求x的值。	As shown in the diagram, AB=2x+3, BC=5x, ADCB is a rhombus. Find the value of x.	33.png	[ "Shape(AD,DE,EA)", "Shape(ED,DC,CE)", "Shape(EC,CB,BE)", "Shape(BA,AE,EB)", "Collinear(AEC)", "Collinear(DEB)" ]	[ "Equal(LengthOfLine(AB),2x+3)", "Equal(LengthOfLine(BC),5x)", "Rhombus(ADCB)" ]	[]	Value(x)	1	[]	{"START": []}
34	XiaokaiZhang_2023-04-02	Geometry3k-34	3	如图所示，OA=3，∠AOB=45°，O是圆O的圆心。求弧OBA的长度。	As shown in the diagram, OA=3, ∠AOB=45°, the center of ⊙O is O. Find the length of ⌒OBA.	34.png	[ "Shape(OA,OAB,BO)", "Shape(AO,OB,OBA)", "Cocircular(O,AB)" ]	[ "Equal(LengthOfLine(OA),3)", "Equal(MeasureOfAngle(AOB),45)", "IsCentreOfCircle(O,O)" ]	[ "Equal(LengthOfLine(OA),3)", "Equal(MeasureOfAngle(AOB),45)", "IsCentreOfCircle(O,O)" ]	Value(LengthOfArc(OBA))	3*pi/4	[ "arc_property_center_angle(1,OBA,O)", "radius_of_circle_property_length_equal(1,OA,O)", "arc_length_formula(1,OBA)" ]	{"START": ["arc_property_center_angle(1,OBA,O)", "radius_of_circle_property_length_equal(1,OA,O)", "arc_length_formula(1,OBA)"]}
35	XiaokaiZhang_2023-04-02	Geometry3k-35	2	如图所示，QR=2，VS=7，S是线段RT的中点，V是线段QU的中点，QUTR是梯形。求直线UT的长度。	As shown in the diagram, QR=2, VS=7, S is the midpoint of segment RT, V bisects segment QU, QU and TR are the non-parallel sides (legs) of trapezoid QUTR. Find the length of line UT.	35.png	[ "Shape(QV,VS,SR,RQ)", "Shape(VU,UT,TS,SV)", "Collinear(QVU)", "Collinear(RST)" ]	[ "Equal(LengthOfLine(QR),2)", "Equal(LengthOfLine(VS),7)", "IsMidpointOfLine(S,RT)", "IsMidpointOfLine(V,QU)", "Trapezoid(QUTR)" ]	[]	Value(LengthOfLine(UT))	12	[ "midsegment_of_quadrilateral_judgment_midpoint(1,VS,QUTR)", "midsegment_of_quadrilateral_property_length(1,VS,QUTR)" ]	{"START": ["midsegment_of_quadrilateral_judgment_midpoint(1,VS,QUTR)"], "midsegment_of_quadrilateral_judgment_midpoint(1,VS,QUTR)": ["midsegment_of_quadrilateral_property_length(1,VS,QUTR)"]}
36	XiaokaiZhang_2023-04-02	Geometry3k-36	2	如图所示，∠ABD=130°，∠CBA=x°，∠DBC=95°。求x的值。	As shown in the diagram, ∠ABD=130°, ∠CBA=x°, ∠DBC=95°. Find the value of x.	36.png	[ "Shape(BAC,CB,BA)", "Shape(BDA,AB,BD)", "Shape(BCD,DB,BC)" ]	[ "Equal(MeasureOfAngle(ABD),130)", "Equal(MeasureOfAngle(CBA),x)", "Equal(MeasureOfAngle(DBC),95)" ]	[ "Equal(MeasureOfAngle(ABD),130)", "Equal(MeasureOfAngle(CBA),x)", "Equal(MeasureOfAngle(DBC),95)" ]	Value(x)	135	[ "angle_addition(1,ABD,DBC)", "round_angle(1,CBA,ABC)" ]	{"START": ["angle_addition(1,ABD,DBC)", "round_angle(1,CBA,ABC)"]}
37	XiaokaiZhang_2023-04-02	Geometry3k-37	2	如图所示，∠DMN=56°，∠GLI=3y-11°，∠HNK=4x°，LI平行于MD，MD∥NS。求x的值。	As shown in the diagram, ∠DMN=56°, ∠GLI=3y-11°, ∠HNK=4x°, LI is parallel to MD, MD is parallel to NS. Find the value of x.	37.png	[ "Shape(HN,NK)", "Shape(KN,NM)", "Shape(NM,ME)", "Shape(EM,ML)", "Shape(ML,LC)", "Shape(CL,LG)", "Shape(GL,LI)", "Shape(IL,LM)", "Shape(LM,MD)", "Shape(DM,MN)", "Shape(MN,NS)", "Shape(SN,NH)", "Collinear(HNMLG)", "Collinear(SNK)", "Collinear(DME)", "Collinear(ILC)" ]	[ "Equal(MeasureOfAngle(DMN),56)", "Equal(MeasureOfAngle(GLI),3y-11)", "Equal(MeasureOfAngle(HNK),4x)", "ParallelBetweenLine(LI,MD)", "ParallelBetweenLine(MD,NS)" ]	[ "Equal(MeasureOfAngle(DMN),56)", "Equal(MeasureOfAngle(GLI),3y-11)", "Equal(MeasureOfAngle(HNK),4x)", "ParallelBetweenLine(LI,MD)", "ParallelBetweenLine(MD,NS)" ]	Value(x)	31	[ "vertical_angle(1,HNK,MNS)", "parallel_property_ipsilateral_internal_angle(1,MD,NS)" ]	{"START": ["vertical_angle(1,HNK,MNS)", "parallel_property_ipsilateral_internal_angle(1,MD,NS)"]}
38	XiaokaiZhang_2023-03-12	Geometry3k-38	3	如图所示，AB=y，AC=8，BC=x，∠BAC=60°，AC垂直于BC。求x的值。	As shown in the diagram, AB=y, AC=8, BC=x, ∠BAC=60°, AC is perpendicular to BC. Find the value of x.	38.png	[ "Shape(AC,CB,BA)" ]	[ "Equal(LengthOfLine(AB),y)", "Equal(LengthOfLine(AC),8)", "Equal(LengthOfLine(BC),x)", "Equal(MeasureOfAngle(BAC),60)", "PerpendicularBetweenLine(AC,BC)" ]	[ "Equal(LengthOfLine(AB),y)", "Equal(LengthOfLine(AC),8)", "Equal(LengthOfLine(BC),x)", "Equal(MeasureOfAngle(BAC),60)", "PerpendicularBetweenLine(AC,BC)" ]	Value(x)	8*sqrt(3)	[ "triangle_property_angle_sum(1,ACB)", "sine_theorem(1,ACB)", "sine_theorem(1,BAC)" ]	{"START": ["triangle_property_angle_sum(1,ACB)", "sine_theorem(1,ACB)", "sine_theorem(1,BAC)"]}
39	XiaokaiZhang_2023-04-02	Geometry3k-39	3	如图所示，EJ=6，LK=7，ML=4，JMLK是平行四边形，JE⊥LE。求JMLK的周长。	As shown in the diagram, EJ=6, LK=7, ML=4, quadrilateral JMLK is a parallelogram, JE is perpendicular to LE. Find the perimeter of quadrilateral JMLK.	39.png	[ "Shape(JM,ME,EJ)", "Shape(JE,EL,LK,KJ)", "Collinear(MEL)" ]	[ "Equal(LengthOfLine(EJ),6)", "Equal(LengthOfLine(LK),7)", "Equal(LengthOfLine(ML),4)", "Parallelogram(JMLK)", "PerpendicularBetweenLine(JE,LE)" ]	[ "Equal(LengthOfLine(EJ),6)", "Equal(LengthOfLine(LK),7)", "Equal(LengthOfLine(ML),4)", "PerpendicularBetweenLine(JE,LE)" ]	Value(PerimeterOfQuadrilateral(JMLK))	22	[ "parallelogram_property_opposite_line_equal(1,JMLK)", "parallelogram_property_opposite_line_equal(1,MLKJ)", "quadrilateral_perimeter_formula(1,JMLK)" ]	{"START": ["parallelogram_property_opposite_line_equal(1,JMLK)", "parallelogram_property_opposite_line_equal(1,MLKJ)", "quadrilateral_perimeter_formula(1,JMLK)"]}
40	XiaokaiZhang_2023-03-12	Geometry3k-40	6	如图所示，AB=8，AC=14，BC=8，BX=x，BX⊥CX。求x的值。	As shown in the diagram, AB=8, AC=14, BC=8, BX=x, BX⊥CX. Find the value of x.	40.png	[ "Shape(BA,AX,XB)", "Shape(BX,XC,CB)", "Collinear(AXC)" ]	[ "Equal(LengthOfLine(AB),8)", "Equal(LengthOfLine(AC),14)", "Equal(LengthOfLine(BC),8)", "Equal(LengthOfLine(BX),x)", "PerpendicularBetweenLine(BX,CX)" ]	[ "Equal(LengthOfLine(AB),8)", "Equal(LengthOfLine(AC),14)", "Equal(LengthOfLine(BC),8)", "Equal(LengthOfLine(BX),x)", "PerpendicularBetweenLine(BX,CX)" ]	Value(x)	sqrt(15)	[ "adjacent_complementary_angle(1,AXB,BXC)", "line_addition(1,AX,XC)", "right_triangle_judgment_angle(1,AXB)", "right_triangle_judgment_angle(1,BXC)", "right_triangle_property_pythagorean(1,AXB)", "right_triangle_property_pythagorean(1,BXC)" ]	{"START": ["adjacent_complementary_angle(1,AXB,BXC)", "line_addition(1,AX,XC)", "right_triangle_judgment_angle(1,BXC)"], "adjacent_complementary_angle(1,AXB,BXC)": ["right_triangle_judgment_angle(1,AXB)"], "right_triangle_judgment_angle(1,AXB)": ["right_triangle_property_pythagorean(1,AXB)"], "right_triangle_judgment_angle(1,BXC)": ["right_triangle_property_pythagorean(1,BXC)"]}
41	XiaokaiZhang_2023-03-12	Geometry3k-41	3	如图所示，NM=4，∠NLM=∠PLN，∠PLN=25°，LM⊥NM，NP⊥LP。求∠MNP的大小。	As shown in the diagram, NM=4, ∠NLM=∠PLN, ∠PLN=25°, LM⊥NM, NP⊥LP. Find the measure of ∠MNP.	41.png	[ "Shape(LM,MN,NL)", "Shape(LN,NP,PL)" ]	[ "Equal(LengthOfLine(NM),4)", "Equal(MeasureOfAngle(NLM),MeasureOfAngle(PLN))", "Equal(MeasureOfAngle(PLN),25)", "PerpendicularBetweenLine(LM,NM)", "PerpendicularBetweenLine(NP,LP)" ]	[ "Equal(LengthOfLine(NM),4)", "Equal(MeasureOfAngle(NLM),MeasureOfAngle(PLN))", "Equal(MeasureOfAngle(PLN),25)", "PerpendicularBetweenLine(LM,NM)", "PerpendicularBetweenLine(NP,LP)" ]	Value(MeasureOfAngle(MNP))	130	[ "triangle_property_angle_sum(1,LMN)", "triangle_property_angle_sum(1,LNP)", "angle_addition(1,MNL,LNP)" ]	{"START": ["triangle_property_angle_sum(1,LMN)", "triangle_property_angle_sum(1,LNP)", "angle_addition(1,MNL,LNP)"]}
42	XiaokaiZhang_2023-03-12	Geometry3k-42	6	如图所示，GF=12，HG=6，HJ=8，JK=x-4，GJ∥FK。求x的值。	As shown in the diagram, GF=12, HG=6, HJ=8, JK=x-4, GJ is parallel to FK. Find the value of x.	42.png	[ "Shape(HG,GJ,JH)", "Shape(GF,FK,KJ,JG)", "Collinear(HGF)", "Collinear(KJH)" ]	[ "Equal(LengthOfLine(GF),12)", "Equal(LengthOfLine(HG),6)", "Equal(LengthOfLine(HJ),8)", "Equal(LengthOfLine(JK),x-4)", "ParallelBetweenLine(GJ,FK)" ]	[]	Value(x)	20	[ "parallel_property_corresponding_angle(1,GJ,FK,H)", "similar_triangle_judgment_aa(1,JHG,KHF)", "line_addition(1,HG,GF)", "line_addition(1,HJ,JK)", "similar_triangle_property_line_ratio(1,JHG,KHF)", "similar_triangle_property_line_ratio(1,GJH,FKH)" ]	{"START": ["parallel_property_corresponding_angle(1,GJ,FK,H)", "line_addition(1,HG,GF)", "line_addition(1,HJ,JK)"], "parallel_property_corresponding_angle(1,GJ,FK,H)": ["similar_triangle_judgment_aa(1,JHG,KHF)"], "similar_triangle_judgment_aa(1,JHG,KHF)": ["similar_triangle_property_line_ratio(1,JHG,KHF)", "similar_triangle_property_line_ratio(1,GJH,FKH)"]}
43	XiaokaiZhang_2023-04-02	Geometry3k-43	1	如图所示，ML=w，MN=2y+5，MR=4x-2，QL=12，QN=3x+2，QR=3y，NQ和MR是▱NMRQ的一组对边。求w的值。	As shown in the diagram, ML=w, MN=2y+5, MR=4x-2, QL=12, QN=3x+2, QR=3y, quadrilateral NMRQ is a ▱. Find the value of w.	43.png	[ "Shape(NM,ML,LN)", "Shape(LM,MR,RL)", "Shape(NL,LQ,QN)", "Shape(LR,RQ,QL)", "Collinear(NLR)", "Collinear(MLQ)" ]	[ "Equal(LengthOfLine(ML),w)", "Equal(LengthOfLine(MN),2y+5)", "Equal(LengthOfLine(MR),4x-2)", "Equal(LengthOfLine(QL),12)", "Equal(LengthOfLine(QN),3x+2)", "Equal(LengthOfLine(QR),3y)", "Parallelogram(NMRQ)" ]	[ "Equal(LengthOfLine(ML),w)", "Equal(LengthOfLine(MN),2y+5)", "Equal(LengthOfLine(MR),4x-2)", "Equal(LengthOfLine(QL),12)", "Equal(LengthOfLine(QN),3x+2)", "Equal(LengthOfLine(QR),3y)" ]	Value(w)	12	[ "parallelogram_property_diagonal_bisection(1,MRQN,L)" ]	{"START": ["parallelogram_property_diagonal_bisection(1,MRQN,L)"]}
44	XiaokaiZhang_2023-03-12	Geometry3k-44	2	如图所示，BA=6，CA=x，CB=x，∠BAC=45°，∠CBA=45°，AC⊥BC。求x的值。	As shown in the diagram, BA=6, CA=x, CB=x, ∠BAC=45°, ∠CBA=45°, AC is perpendicular to BC. Find the value of x.	44.png	[ "Shape(CB,BA,AC)" ]	[ "Equal(LengthOfLine(BA),6)", "Equal(LengthOfLine(CA),x)", "Equal(LengthOfLine(CB),x)", "Equal(MeasureOfAngle(BAC),45)", "Equal(MeasureOfAngle(CBA),45)", "PerpendicularBetweenLine(AC,BC)" ]	[ "Equal(LengthOfLine(BA),6)", "Equal(LengthOfLine(CA),x)", "Equal(LengthOfLine(CB),x)", "Equal(MeasureOfAngle(BAC),45)", "Equal(MeasureOfAngle(CBA),45)", "PerpendicularBetweenLine(AC,BC)" ]	Value(x)	3*sqrt(2)	[ "right_triangle_judgment_angle(1,ACB)", "right_triangle_property_pythagorean(1,ACB)" ]	{"START": ["right_triangle_judgment_angle(1,ACB)"], "right_triangle_judgment_angle(1,ACB)": ["right_triangle_property_pythagorean(1,ACB)"]}
45	XiaokaiZhang_2023-04-02	Geometry3k-45	1	如图所示，∠YVW=25°，⌒AXZ的角度为110，弧AYW的角度为x。求x的值。	As shown in the diagram, ∠YVW=25°, the measure of ⌒AXZ is 110, the measure of arc AYW is x. Find the value of x.	45.png	[ "Shape(YV,VW,AYW)", "Shape(AZY,YZ)", "Shape(AYW,WX,AXZ,ZY)", "Shape(AWX,XW)", "Collinear(VYZ)", "Collinear(VWX)", "Cocircular(A,ZYWX)" ]	[ "Equal(MeasureOfAngle(YVW),25)", "Equal(MeasureOfArc(AXZ),110)", "Equal(MeasureOfArc(AYW),x)" ]	[ "Equal(MeasureOfAngle(YVW),25)", "Equal(MeasureOfArc(AXZ),110)", "Equal(MeasureOfArc(AYW),x)" ]	Value(x)	60	[ "circle_property_circular_power_segment_and_segment_angle(1,VYZ,VWX,A)" ]	{"START": ["circle_property_circular_power_segment_and_segment_angle(1,VYZ,VWX,A)"]}
46	XiaokaiZhang_2023-04-02	Geometry3k-46	4	如图所示，KJ=11，∠JKL=65°，圆K的圆心为K。求扇形KJL的面积。	As shown in the diagram, KJ=11, ∠JKL=65°, the center of circle K is K. Find the area of the sector KJL.	46.png	[ "Shape(KJ,KJL,LK)", "Shape(JK,KL,KLJ)", "Cocircular(K,JL)" ]	[ "Equal(LengthOfLine(KJ),11)", "Equal(MeasureOfAngle(JKL),65)", "IsCentreOfCircle(K,K)" ]	[ "Equal(LengthOfLine(KJ),11)", "Equal(MeasureOfAngle(JKL),65)", "IsCentreOfCircle(K,K)" ]	Value(AreaOfSector(KJL))	7139*pi/72	[ "round_angle(1,JKL,LKJ)", "radius_of_circle_property_length_equal(1,KJ,K)", "arc_property_center_angle(1,KJL,K)", "sector_area_formula(1,KJL)" ]	{"START": ["round_angle(1,JKL,LKJ)", "radius_of_circle_property_length_equal(1,KJ,K)", "arc_property_center_angle(1,KJL,K)", "sector_area_formula(1,KJL)"]}
47	XiaokaiZhang_2023-04-02	Geometry3k-47	15	如图所示，AZ=y，QZ=z，RQ=12，RS=10，RZ=x，∠SPA=45°，∠ZQR=30°，SR∥AZ，PA垂直于SA，RZ⊥QZ，四边形SPQR是梯形。求SPQR的周长。	As shown in the diagram, AZ=y, QZ=z, RQ=12, RS=10, RZ=x, ∠SPA=45°, ∠ZQR=30°, SR is parallel to AZ, PA⊥SA, RZ is perpendicular to QZ, SPQR is a trapezoid. Find the perimeter of quadrilateral SPQR.	47.png	[ "Shape(SP,PA,AS)", "Shape(SA,AZ,ZR,RS)", "Shape(RZ,ZQ,QR)", "Collinear(PAZQ)" ]	[ "Equal(LengthOfLine(AZ),y)", "Equal(LengthOfLine(QZ),z)", "Equal(LengthOfLine(RQ),12)", "Equal(LengthOfLine(RS),10)", "Equal(LengthOfLine(RZ),x)", "Equal(MeasureOfAngle(SPA),45)", "Equal(MeasureOfAngle(ZQR),30)", "ParallelBetweenLine(SR,AZ)", "PerpendicularBetweenLine(PA,SA)", "PerpendicularBetwee...	[ "Equal(LengthOfLine(AZ),y)", "Equal(LengthOfLine(QZ),z)", "Equal(LengthOfLine(RQ),12)", "Equal(LengthOfLine(RS),10)", "Equal(LengthOfLine(RZ),x)", "Equal(MeasureOfAngle(SPA),45)", "Equal(MeasureOfAngle(ZQR),30)", "ParallelBetweenLine(SR,AZ)", "PerpendicularBetweenLine(PA,SA)", "PerpendicularBetwee...	Value(PerimeterOfQuadrilateral(SPQR))	6sqrt(2)+6sqrt(3)+38	[ "triangle_property_angle_sum(1,RZQ)", "sine_theorem(1,RZQ)", "sine_theorem(1,QRZ)", "altitude_of_quadrilateral_judgment_left_vertex(2,SA,SPQR)", "adjacent_complementary_angle(1,PZR,RZQ)", "altitude_of_quadrilateral_judgment_right_vertex(2,RZ,SPQR)", "parallel_judgment_corresponding_angle(1,AS,ZR,P)", ...	{"START": ["triangle_property_angle_sum(1,RZQ)", "sine_theorem(1,RZQ)", "sine_theorem(1,QRZ)", "altitude_of_quadrilateral_judgment_left_vertex(2,SA,SPQR)", "adjacent_complementary_angle(1,PZR,RZQ)", "triangle_property_angle_sum(1,SPA)", "sine_theorem(1,SPA)", "line_addition(1,PA,AZ)", "line_addition(1,PZ,ZQ)", "quadrilateral_perimeter_formula(1,SPQR)"], "adjacent_complementary_angle(1,PZR,RZQ)": ["altitude_of_quadrilateral_judgment_right_vertex(2,RZ,SPQR)", "parallel_judgment_corresponding_angle(1,AS,ZR,P)"], "parallel_judgment_corresponding_angle(1,AS,ZR,P)": ["parallelogram_judgment_parallel_and_parallel(1,SAZR)"], "parallelogram_judgment_parallel_and_parallel(1,SAZR)": ["parallelogram_property_opposite_line_equal(1,AZRS)"], "triangle_property_angle_sum(1,SPA)": ["isosceles_triangle_judgment_angle_equal(1,ASP)"]}
48	XiaokaiZhang_2023-04-02	Geometry3k-48	4	如图所示，∠EYQ=3y+1°，∠MAQ=3x+11°，∠YQF=4*x-5°，EF平行于YQ，QA∥YM，YQ平行于MA。求y的值。	As shown in the diagram, ∠EYQ=3y+1°, ∠MAQ=3x+11°, ∠YQF=4*x-5°, EF∥YQ, QA is parallel to YM, YQ∥MA. Find the value of y.	48.png	[ "Shape(EY,YQ,QF,FE)", "Shape(YM,MA,AQ,QY)", "Collinear(EYM)", "Collinear(FQA)" ]	[ "Equal(MeasureOfAngle(EYQ),3y+1)", "Equal(MeasureOfAngle(MAQ),3x+11)", "Equal(MeasureOfAngle(YQF),4*x-5)", "ParallelBetweenLine(EF,YQ)", "ParallelBetweenLine(QA,YM)", "ParallelBetweenLine(YQ,MA)" ]	[ "Equal(MeasureOfAngle(EYQ),3y+1)", "Equal(MeasureOfAngle(MAQ),3x+11)", "Equal(MeasureOfAngle(YQF),4*x-5)", "ParallelBetweenLine(EF,YQ)", "ParallelBetweenLine(QA,YM)", "ParallelBetweenLine(YQ,MA)" ]	Value(y)	40	[ "parallel_property_corresponding_angle(2,AM,QY,F)", "parallelogram_judgment_parallel_and_parallel(1,YMAQ)", "parallelogram_property_opposite_angle_equal(1,YMAQ)", "adjacent_complementary_angle(1,EYQ,QYM)" ]	{"START": ["parallel_property_corresponding_angle(2,AM,QY,F)", "parallelogram_judgment_parallel_and_parallel(1,YMAQ)", "adjacent_complementary_angle(1,EYQ,QYM)"], "parallelogram_judgment_parallel_and_parallel(1,YMAQ)": ["parallelogram_property_opposite_angle_equal(1,YMAQ)"]}
49	XiaokaiZhang_2023-04-02	Geometry3k-49	2	如图所示，∠AXW=82°，∠YXA=33°，WX和ZY是平行四边形XWZY的一组对边。求∠WZY的大小。	As shown in the diagram, ∠AXW=82°, ∠YXA=33°, quadrilateral XWZY is a ▱. Find the measure of ∠WZY.	49.png	[ "Shape(XW,WA,AX)", "Shape(AW,WZ,ZA)", "Shape(AZ,ZY,YA)", "Shape(XA,AY,YX)", "Collinear(XAZ)", "Collinear(WAY)" ]	[ "Equal(MeasureOfAngle(AXW),82)", "Equal(MeasureOfAngle(YXA),33)", "Parallelogram(XWZY)" ]	[ "Equal(MeasureOfAngle(AXW),82)", "Equal(MeasureOfAngle(YXA),33)" ]	Value(MeasureOfAngle(WZY))	115	[ "angle_addition(1,YXA,AXW)", "parallelogram_property_opposite_angle_equal(1,XWZY)" ]	{"START": ["angle_addition(1,YXA,AXW)", "parallelogram_property_opposite_angle_equal(1,XWZY)"]}
50	XiaokaiZhang_2023-03-12	Geometry3k-50	4	如图所示，FE=6，FG=3，FH=4，HG=2，△DEF相似于△GFH。求△DEF的周长。	As shown in the diagram, FE=6, FG=3, FH=4, HG=2, triangle DEF is similar to triangle GFH.. Find the perimeter of △DEF.	50.png	[ "Shape(DE,EF,FD)", "Shape(CD,DF,FG,GC)", "Shape(GF,FH,HG)", "Collinear(CDE)", "Collinear(EFH)", "Collinear(HGC)" ]	[ "Equal(LengthOfLine(FE),6)", "Equal(LengthOfLine(FG),3)", "Equal(LengthOfLine(FH),4)", "Equal(LengthOfLine(HG),2)", "SimilarBetweenTriangle(DEF,GFH)" ]	[ "Equal(LengthOfLine(FE),6)", "Equal(LengthOfLine(FG),3)", "Equal(LengthOfLine(FH),4)", "Equal(LengthOfLine(HG),2)" ]	Value(PerimeterOfTriangle(DEF))	27/2	[ "similar_triangle_property_line_ratio(1,DEF,GFH)", "similar_triangle_property_line_ratio(1,FDE,HGF)", "similar_triangle_property_line_ratio(1,EFD,FHG)", "triangle_perimeter_formula(1,DEF)" ]	{"START": ["similar_triangle_property_line_ratio(1,DEF,GFH)", "similar_triangle_property_line_ratio(1,FDE,HGF)", "similar_triangle_property_line_ratio(1,EFD,FHG)", "triangle_perimeter_formula(1,DEF)"]}
51	XiaokaiZhang_2023-04-02	Geometry3k-51	1	如图所示，∠LWX=3a+40°，∠WXE=2a+25°，∠XZK=5*b-26°，WL∥XE，XN平行于ZK。求a的值。	As shown in the diagram, ∠LWX=3a+40°, ∠WXE=2a+25°, ∠XZK=5*b-26°, WL∥XE, XN is parallel to ZK. Find the value of a.	51.png	[ "Shape(GW,WL)", "Shape(LW,WX)", "Shape(WX,XE)", "Shape(EX,XN)", "Shape(NX,XZ)", "Shape(XZ,ZK)", "Shape(KZ,ZH)", "Shape(HZ,ZY)", "Shape(ZY,YM)", "Shape(MY,YI)", "Shape(IY,YW)", "Shape(YW,WG)", "Shape(WY,YZ,ZX,XW)", "Collinear(GWXN)", "Collinear(IYZK)", "Collinear(LWYM)", "Collinear(EX...	[ "Equal(MeasureOfAngle(LWX),3a+40)", "Equal(MeasureOfAngle(WXE),2a+25)", "Equal(MeasureOfAngle(XZK),5*b-26)", "ParallelBetweenLine(WL,XE)", "ParallelBetweenLine(XN,ZK)" ]	[ "ParallelBetweenLine(WL,XE)", "ParallelBetweenLine(XN,ZK)" ]	Value(a)	23	[ "parallel_property_ipsilateral_internal_angle(1,WL,XE)" ]	{"START": ["parallel_property_ipsilateral_internal_angle(1,WL,XE)"]}
52	XiaokaiZhang_2023-03-12	Geometry3k-52	1	如图所示，∠AGC=40°，∠DGF=53°，CB垂直于GB，FG垂直于CG，GF⊥DF。求∠FDG的大小。	As shown in the diagram, ∠AGC=40°, ∠DGF=53°, CB⊥GB, FG is perpendicular to CG, GF is perpendicular to DF. Find the measure of ∠FDG.	52.png	[ "Shape(DG,GF,FD)", "Shape(FG,GA,AF)", "Shape(BG,GC,CB)", "Shape(AB,BC,CA)", "Collinear(DFA)", "Collinear(ABG)" ]	[ "Equal(MeasureOfAngle(AGC),40)", "Equal(MeasureOfAngle(DGF),53)", "PerpendicularBetweenLine(CB,GB)", "PerpendicularBetweenLine(FG,CG)", "PerpendicularBetweenLine(GF,DF)" ]	[ "PerpendicularBetweenLine(CB,GB)", "PerpendicularBetweenLine(FG,CG)", "PerpendicularBetweenLine(GF,DF)" ]	Value(MeasureOfAngle(FDG))	37	[ "triangle_property_angle_sum(1,DGF)" ]	{"START": ["triangle_property_angle_sum(1,DGF)"]}
53	XiaokaiZhang_2023-04-02	Geometry3k-53	4	如图所示，∠FOE=45°，O是⊙O的圆心，CO⊥AO，EO垂直于BO。求弧OAE的角度。	As shown in the diagram, ∠FOE=45°, the center of circle O is O, CO⊥AO, EO⊥BO. Find the measure of arc OAE.	53.png	[ "Shape(OE,OEF,FO)", "Shape(OF,OFA,AO)", "Shape(OA,OAC,CO)", "Shape(OC,OCB,BO)", "Shape(OB,OBE,EO)", "Collinear(EOC)", "Collinear(AOB)", "Cocircular(O,EFACB)" ]	[ "Equal(MeasureOfAngle(FOE),45)", "IsCentreOfCircle(O,O)", "PerpendicularBetweenLine(CO,AO)", "PerpendicularBetweenLine(EO,BO)" ]	[ "Equal(MeasureOfAngle(FOE),45)", "IsCentreOfCircle(O,O)", "PerpendicularBetweenLine(CO,AO)", "PerpendicularBetweenLine(EO,BO)" ]	Value(MeasureOfArc(OAE))	270	[ "adjacent_complementary_angle(1,EOB,BOC)", "angle_addition(1,EOB,BOC)", "angle_addition(1,EOC,COA)", "arc_property_center_angle(1,OAE,O)" ]	{"START": ["adjacent_complementary_angle(1,EOB,BOC)", "angle_addition(1,EOB,BOC)", "angle_addition(1,EOC,COA)", "arc_property_center_angle(1,OAE,O)"]}
54	XiaokaiZhang_2023-04-02	Geometry3k-54	8	如图所示，BC=8，BH=12，圆O的圆心为O，四边形DCBH是矩形。求四边形DCBH的面积减去扇形ODH的面积。	As shown in the diagram, BC=8, BH=12, the center of circle O is O, quadrilateral DCBH is a rectangle. Find the area of quadrilateral DCBH minus the area of the sector ODH.	54.png	[ "Shape(DC,CB,BH,ODH)", "Shape(OD,ODH,HO)", "Collinear(DOH)", "Cocircular(O,DH)" ]	[ "Equal(LengthOfLine(BC),8)", "Equal(LengthOfLine(BH),12)", "IsCentreOfCircle(O,O)", "Rectangle(DCBH)" ]	[ "Equal(LengthOfLine(BC),8)", "Equal(LengthOfLine(BH),12)", "IsCentreOfCircle(O,O)" ]	Value(Sub(AreaOfQuadrilateral(DCBH),AreaOfSector(ODH)))	96-8*pi	[ "parallelogram_area_formula_sine(1,CBHD)", "diameter_of_circle_judgment_pass_centre(1,DOH,O)", "parallelogram_property_opposite_line_equal(1,CBHD)", "diameter_of_circle_property_length_equal(1,DH,O)", "circle_property_length_of_radius_and_diameter(1,O)", "flat_angle(1,HOD)", "arc_property_center_angle(1...	{"START": ["parallelogram_area_formula_sine(1,CBHD)", "diameter_of_circle_judgment_pass_centre(1,DOH,O)", "parallelogram_property_opposite_line_equal(1,CBHD)", "circle_property_length_of_radius_and_diameter(1,O)", "flat_angle(1,HOD)", "arc_property_center_angle(1,ODH,O)", "sector_area_formula(1,ODH)"], "diameter_of_circle_judgment_pass_centre(1,DOH,O)": ["diameter_of_circle_property_length_equal(1,DH,O)"]}
55	XiaokaiZhang_2023-03-12	Geometry3k-55	2	如图所示，AB=10，AC=6，BC=x，AC垂直于BC。求x的值。	As shown in the diagram, AB=10, AC=6, BC=x, AC⊥BC. Find the value of x.	55.png	[ "Shape(AC,CB,BA)" ]	[ "Equal(LengthOfLine(AB),10)", "Equal(LengthOfLine(AC),6)", "Equal(LengthOfLine(BC),x)", "PerpendicularBetweenLine(AC,BC)" ]	[ "Equal(LengthOfLine(AB),10)", "Equal(LengthOfLine(AC),6)", "Equal(LengthOfLine(BC),x)", "PerpendicularBetweenLine(AC,BC)" ]	Value(x)	8	[ "right_triangle_judgment_angle(1,ACB)", "right_triangle_property_pythagorean(1,ACB)" ]	{"START": ["right_triangle_judgment_angle(1,ACB)"], "right_triangle_judgment_angle(1,ACB)": ["right_triangle_property_pythagorean(1,ACB)"]}
56	XiaokaiZhang_2023-03-12	Geometry3k-56	0	如图所示，AB=10.9，EP=14.9，PA=13，∠DCP=28.5°，∠PAE=33°，P是三角形AEC内切圆的圆心，ED垂直于PD，PB垂直于AB，PF⊥EF。求∠CAD的大小。	As shown in the diagram, AB=10.9, EP=14.9, PA=13, ∠DCP=28.5°, ∠PAE=33°, P is the center of the inscribed circle of triangle AEC, ED is perpendicular to PD, PB is perpendicular to AB, PF is perpendicular to EF. Find the measure of ∠CAD.	56.png	[ "Shape(AF,FP,PA)", "Shape(FE,EP,PF)", "Shape(AP,PB,BA)", "Shape(PE,ED,DP)", "Shape(PD,DC,CP)", "Shape(BP,PC,CB)", "Collinear(AFE)", "Collinear(EDC)", "Collinear(CBA)", "Collinear(EPB)", "Collinear(FPC)", "Collinear(DPA)" ]	[ "Equal(LengthOfLine(AB),10.9)", "Equal(LengthOfLine(EP),14.9)", "Equal(LengthOfLine(PA),13)", "Equal(MeasureOfAngle(DCP),28.5)", "Equal(MeasureOfAngle(PAE),33)", "IsIncenterOfTriangle(P,AEC)", "PerpendicularBetweenLine(ED,PD)", "PerpendicularBetweenLine(PB,AB)", "PerpendicularBetweenLine(PF,EF)" ]	[ "Equal(LengthOfLine(AB),10.9)", "Equal(LengthOfLine(EP),14.9)", "Equal(LengthOfLine(PA),13)", "Equal(MeasureOfAngle(DCP),28.5)", "Equal(MeasureOfAngle(PAE),33)", "PerpendicularBetweenLine(ED,PD)", "PerpendicularBetweenLine(PB,AB)", "PerpendicularBetweenLine(PF,EF)" ]	Value(MeasureOfAngle(CAD))	33	[]	{"START": []}
57	XiaokaiZhang_2023-04-02	Geometry3k-57	0	如图所示，AB=14，DP⊥AP，四边形ADCB是菱形。求直线BC的长度。	As shown in the diagram, AB=14, DP is perpendicular to AP, ADCB is a rhombus. Find the length of line BC.	57.png	[ "Shape(AD,DP,PA)", "Shape(PD,DC,CP)", "Shape(PC,CB,BP)", "Shape(AP,PB,BA)", "Collinear(APC)", "Collinear(DPB)" ]	[ "Equal(LengthOfLine(AB),14)", "PerpendicularBetweenLine(DP,AP)", "Rhombus(ADCB)" ]	[ "PerpendicularBetweenLine(DP,AP)" ]	Value(LengthOfLine(BC))	14	[]	{"START": []}
58	XiaokaiZhang_2023-04-02	Geometry3k-58	3	如图所示，∠BCE=∠EBC，∠DAG=136°，∠DEA=47°，∠EFB=63°，∠FED=69°。求∠EBC的大小。	As shown in the diagram, ∠BCE=∠EBC, ∠DAG=136°, ∠DEA=47°, ∠EFB=63°, ∠FED=69°. Find the measure of ∠EBC.	58.png	[ "Shape(FB,BE,EF)", "Shape(DE,EA,AD)", "Shape(BC,CE,EB)", "Shape(FE,ED)", "Shape(FE,EA)", "Shape(DA,AG)", "Shape(AE,EC)", "Collinear(BEAG)", "Collinear(FEC)" ]	[ "Equal(MeasureOfAngle(BCE),MeasureOfAngle(EBC))", "Equal(MeasureOfAngle(DAG),136)", "Equal(MeasureOfAngle(DEA),47)", "Equal(MeasureOfAngle(EFB),63)", "Equal(MeasureOfAngle(FED),69)" ]	[ "Equal(MeasureOfAngle(DAG),136)", "Equal(MeasureOfAngle(DEA),47)", "Equal(MeasureOfAngle(EFB),63)", "Equal(MeasureOfAngle(FED),69)" ]	Value(MeasureOfAngle(EBC))	32	[ "angle_addition(1,FED,DEA)", "vertical_angle(1,FEA,CEB)", "triangle_property_angle_sum(1,EBC)" ]	{"START": ["angle_addition(1,FED,DEA)", "vertical_angle(1,FEA,CEB)", "triangle_property_angle_sum(1,EBC)"]}
59	XiaokaiZhang_2023-04-02	Geometry3k-59	2	如图所示，∠LWX=53°，WL∥XE，XN平行于ZK。求∠XZK的大小。	As shown in the diagram, ∠LWX=53°, WL∥XE, XN is parallel to ZK. Find the measure of ∠XZK.	59.png	[ "Shape(GW,WL)", "Shape(LW,WX)", "Shape(WX,XE)", "Shape(EX,XN)", "Shape(NX,XZ)", "Shape(XZ,ZK)", "Shape(KZ,ZH)", "Shape(HZ,ZY)", "Shape(ZY,YM)", "Shape(MY,YI)", "Shape(IY,YW)", "Shape(YW,WG)", "Shape(WY,YZ,ZX,XW)", "Collinear(GWXN)", "Collinear(IYZK)", "Collinear(LWYM)", "Collinear(EX...	[ "Equal(MeasureOfAngle(LWX),53)", "ParallelBetweenLine(WL,XE)", "ParallelBetweenLine(XN,ZK)" ]	[ "ParallelBetweenLine(WL,XE)", "ParallelBetweenLine(XN,ZK)" ]	Value(MeasureOfAngle(XZK))	53	[ "parallel_property_corresponding_angle(2,WL,XE,N)", "parallel_property_corresponding_angle(1,XN,ZK,E)" ]	{"START": ["parallel_property_corresponding_angle(2,WL,XE,N)", "parallel_property_corresponding_angle(1,XN,ZK,E)"]}
60	XiaokaiZhang_2023-03-12	Geometry3k-60	8	如图所示，AC=x，AD=4，BC=y，BD=9，CD=z，AC⊥BC，BD⊥CD。求z的值。	As shown in the diagram, AC=x, AD=4, BC=y, BD=9, CD=z, AC⊥BC, BD⊥CD. Find the value of z.	60.png	[ "Shape(AC,CD,DA)", "Shape(DC,CB,BD)", "Collinear(BDA)" ]	[ "Equal(LengthOfLine(AC),x)", "Equal(LengthOfLine(AD),4)", "Equal(LengthOfLine(BC),y)", "Equal(LengthOfLine(BD),9)", "Equal(LengthOfLine(CD),z)", "PerpendicularBetweenLine(AC,BC)", "PerpendicularBetweenLine(BD,CD)" ]	[ "Equal(LengthOfLine(AC),x)", "Equal(LengthOfLine(AD),4)", "Equal(LengthOfLine(BC),y)", "Equal(LengthOfLine(BD),9)", "Equal(LengthOfLine(CD),z)", "PerpendicularBetweenLine(AC,BC)", "PerpendicularBetweenLine(BD,CD)" ]	Value(z)	6	[ "line_addition(1,AD,DB)", "adjacent_complementary_angle(1,BDC,CDA)", "right_triangle_judgment_angle(1,ACB)", "right_triangle_judgment_angle(1,BDC)", "right_triangle_judgment_angle(1,CDA)", "right_triangle_property_pythagorean(1,ACB)", "right_triangle_property_pythagorean(1,BDC)", "right_triangle_prope...	{"START": ["line_addition(1,AD,DB)", "adjacent_complementary_angle(1,BDC,CDA)", "right_triangle_judgment_angle(1,ACB)", "right_triangle_judgment_angle(1,BDC)"], "adjacent_complementary_angle(1,BDC,CDA)": ["right_triangle_judgment_angle(1,CDA)"], "right_triangle_judgment_angle(1,ACB)": ["right_triangle_property_pythagorean(1,ACB)"], "right_triangle_judgment_angle(1,BDC)": ["right_triangle_property_pythagorean(1,BDC)"], "right_triangle_judgment_angle(1,CDA)": ["right_triangle_property_pythagorean(1,CDA)"]}
61	XiaokaiZhang_2023-03-12	Geometry3k-61	1	如图所示，AB=8，CA=10，CB=a，∠BAC=60°。求a的值。	As shown in the diagram, AB=8, CA=10, CB=a, ∠BAC=60°. Find the value of a.	61.png	[ "Shape(AC,CB,BA)" ]	[ "Equal(LengthOfLine(AB),8)", "Equal(LengthOfLine(CA),10)", "Equal(LengthOfLine(CB),a)", "Equal(MeasureOfAngle(BAC),60)" ]	[ "Equal(LengthOfLine(AB),8)", "Equal(LengthOfLine(CA),10)", "Equal(LengthOfLine(CB),a)", "Equal(MeasureOfAngle(BAC),60)" ]	Value(a)	2*sqrt(21)	[ "cosine_theorem(1,ACB)" ]	{"START": ["cosine_theorem(1,ACB)"]}
62	XiaokaiZhang_2023-04-02	Geometry3k-62	7	如图所示，AB=BC，DF=3*x-7，FE=x+9，圆F的圆心为F，CE垂直于FE，FD垂直于AD。求x的值。	As shown in the diagram, AB=BC, DF=3*x-7, FE=x+9, the center of ⊙F is F, CE is perpendicular to FE, FD⊥AD. Find the value of x.	62.png	[ "Shape(DB,FBA,AD)", "Shape(BD,DF,FB)", "Shape(BF,FE,EB)", "Shape(FD,DA,FAC,CE,EF)", "Shape(BE,EC,FCB)", "Collinear(BEC)", "Collinear(BDA)", "Cocircular(F,BAC)" ]	[ "Equal(LengthOfLine(AB),LengthOfLine(BC))", "Equal(LengthOfLine(DF),3*x-7)", "Equal(LengthOfLine(FE),x+9)", "IsCentreOfCircle(F,F)", "PerpendicularBetweenLine(CE,FE)", "PerpendicularBetweenLine(FD,AD)" ]	[ "IsCentreOfCircle(F,F)", "PerpendicularBetweenLine(CE,FE)", "PerpendicularBetweenLine(FD,AD)" ]	Value(x)	8	[ "adjacent_complementary_angle(1,BDF,FDA)", "circle_property_chord_perpendicular_bisect_chord(1,F,FD,BA)", "circle_property_chord_perpendicular_bisect_chord(1,F,FE,CB)", "line_addition(1,BD,DA)", "line_addition(1,BE,EC)", "mirror_congruent_triangle_judgment_hl(2,BDF,BFE)", "mirror_congruent_triangle_prop...	{"START": ["adjacent_complementary_angle(1,BDF,FDA)", "circle_property_chord_perpendicular_bisect_chord(1,F,FE,CB)", "line_addition(1,BD,DA)", "line_addition(1,BE,EC)"], "adjacent_complementary_angle(1,BDF,FDA)": ["circle_property_chord_perpendicular_bisect_chord(1,F,FD,BA)", "mirror_congruent_triangle_judgment_hl(2,BDF,BFE)"], "circle_property_chord_perpendicular_bisect_chord(1,F,FD,BA)": ["mirror_congruent_triangle_judgment_hl(2,BDF,BFE)"], "circle_property_chord_perpendicular_bisect_chord(1,F,FE,CB)": ["mirror_congruent_triangle_judgment_hl(2,BDF,BFE)", "mirror_congruent_triangle_judgment_hl(2,BDF,BFE)"], "line_addition(1,BD,DA)": ["mirror_congruent_triangle_judgment_hl(2,BDF,BFE)"], "line_addition(1,BE,EC)": ["mirror_congruent_triangle_judgment_hl(2,BDF,BFE)"], "mirror_congruent_triangle_judgment_hl(2,BDF,BFE)": ["mirror_congruent_triangle_property_line_equal(1,BDF,BFE)"]}
63	XiaokaiZhang_2023-04-02	Geometry3k-63	1	如图所示，∠CFD=x+36°，∠DEC=2*y°，∠ECF=78°，∠FDE=110°，CE平行于FD。求y的值。	As shown in the diagram, ∠CFD=x+36°, ∠DEC=2*y°, ∠ECF=78°, ∠FDE=110°, CE is parallel to FD. Find the value of y.	63.png	[ "Shape(EC,CF,FD,DE)" ]	[ "Equal(MeasureOfAngle(CFD),x+36)", "Equal(MeasureOfAngle(DEC),2*y)", "Equal(MeasureOfAngle(ECF),78)", "Equal(MeasureOfAngle(FDE),110)", "ParallelBetweenLine(CE,FD)" ]	[ "Equal(MeasureOfAngle(CFD),x+36)", "Equal(MeasureOfAngle(DEC),2*y)", "Equal(MeasureOfAngle(ECF),78)", "Equal(MeasureOfAngle(FDE),110)", "ParallelBetweenLine(CE,FD)" ]	Value(y)	35	[ "parallel_property_ipsilateral_internal_angle(1,DF,EC)" ]	{"START": ["parallel_property_ipsilateral_internal_angle(1,DF,EC)"]}
64	XiaokaiZhang_2023-04-02	Geometry3k-64	2	如图所示，∠AJH=x°，∠HGB=2*x°，GB垂直于HB，JH⊥GH。求∠BHG的大小。	As shown in the diagram, ∠AJH=x°, ∠HGB=2*x°, GB⊥HB, JH is perpendicular to GH. Find the measure of ∠BHG.	64.png	[ "Shape(AGF,FB,BG)", "Shape(AB,BF,AFJ,JA)", "Shape(BA,AJ,JH,HB)", "Shape(AJH,HJ)", "Shape(BH,HG,GB)", "Shape(AHG,GH)", "Collinear(FBH)", "Collinear(GBAJ)", "Cocircular(A,GFJH)" ]	[ "Equal(MeasureOfAngle(AJH),x)", "Equal(MeasureOfAngle(HGB),2*x)", "PerpendicularBetweenLine(GB,HB)", "PerpendicularBetweenLine(JH,GH)" ]	[ "PerpendicularBetweenLine(GB,HB)", "PerpendicularBetweenLine(JH,GH)" ]	Value(MeasureOfAngle(BHG))	30	[ "triangle_property_angle_sum(1,GJH)", "triangle_property_angle_sum(1,GBH)" ]	{"START": ["triangle_property_angle_sum(1,GJH)", "triangle_property_angle_sum(1,GBH)"]}
65	XiaokaiZhang_2023-04-02	Geometry3k-65	2	如图所示，∠CBD=55°，∠FBG=35°，圆B的圆心为B。求⌒BCD的角度。	As shown in the diagram, ∠CBD=55°, ∠FBG=35°, B is the center of circle B. Find the measure of arc BCD.	65.png	[ "Shape(BC,BCA,AB)", "Shape(BA,BAG,GB)", "Shape(BG,BGF,FB)", "Shape(BF,BFD,DB)", "Shape(BD,BDC,CB)", "Collinear(CBG)", "Collinear(ABD)", "Cocircular(B,AGFDC)" ]	[ "Equal(MeasureOfAngle(CBD),55)", "Equal(MeasureOfAngle(FBG),35)", "IsCentreOfCircle(B,B)" ]	[ "Equal(MeasureOfAngle(CBD),55)", "Equal(MeasureOfAngle(FBG),35)", "IsCentreOfCircle(B,B)" ]	Value(MeasureOfArc(BCD))	305	[ "round_angle(1,CBD,DBC)", "arc_property_center_angle(1,BCD,B)" ]	{"START": ["round_angle(1,CBD,DBC)", "arc_property_center_angle(1,BCD,B)"]}
66	XiaokaiZhang_2023-03-12	Geometry3k-66	2	如图所示，BA=3x-13，BC=2x+5，∠BCD=∠CDB，∠BDA=∠DAB，∠DBC=60°。求x的值。	As shown in the diagram, BA=3x-13, BC=2x+5, ∠BCD=∠CDB, ∠BDA=∠DAB, ∠DBC=60°. Find the value of x.	66.png	[ "Shape(BC,CD,DB)", "Shape(BD,DA,AB)" ]	[ "Equal(LengthOfLine(BA),3x-13)", "Equal(LengthOfLine(BC),2x+5)", "Equal(MeasureOfAngle(BCD),MeasureOfAngle(CDB))", "Equal(MeasureOfAngle(BDA),MeasureOfAngle(DAB))", "Equal(MeasureOfAngle(DBC),60)" ]	[ "Equal(LengthOfLine(BA),3x-13)", "Equal(LengthOfLine(BC),2x+5)", "Equal(MeasureOfAngle(BCD),MeasureOfAngle(CDB))", "Equal(MeasureOfAngle(BDA),MeasureOfAngle(DAB))", "Equal(MeasureOfAngle(DBC),60)" ]	Value(x)	18	[ "isosceles_triangle_judgment_angle_equal(1,BCD)", "isosceles_triangle_judgment_angle_equal(1,BDA)" ]	{"START": ["isosceles_triangle_judgment_angle_equal(1,BCD)", "isosceles_triangle_judgment_angle_equal(1,BDA)"]}
67	XiaokaiZhang_2023-03-12	Geometry3k-67	3	如图所示，QT=x，RQ=6，SQ=18，SR=14，∠TRQ=∠SRT。求x的值。	As shown in the diagram, QT=x, RQ=6, SQ=18, SR=14, ∠TRQ=∠SRT. Find the value of x.	67.png	[ "Shape(QT,TR,RQ)", "Shape(TS,SR,RT)", "Collinear(QTS)" ]	[ "Equal(LengthOfLine(QT),x)", "Equal(LengthOfLine(RQ),6)", "Equal(LengthOfLine(SQ),18)", "Equal(LengthOfLine(SR),14)", "Equal(MeasureOfAngle(TRQ),MeasureOfAngle(SRT))" ]	[ "Equal(LengthOfLine(QT),x)", "Equal(LengthOfLine(RQ),6)", "Equal(LengthOfLine(SQ),18)", "Equal(LengthOfLine(SR),14)", "Equal(MeasureOfAngle(TRQ),MeasureOfAngle(SRT))" ]	Value(x)	27/5	[ "line_addition(1,QT,TS)", "bisector_of_angle_judgment_angle_equal(1,RT,SRQ)", "bisector_of_angle_property_line_ratio(1,RT,SRQ)" ]	{"START": ["line_addition(1,QT,TS)", "bisector_of_angle_judgment_angle_equal(1,RT,SRQ)"], "bisector_of_angle_judgment_angle_equal(1,RT,SRQ)": ["bisector_of_angle_property_line_ratio(1,RT,SRQ)"]}
68	XiaokaiZhang_2023-03-12	Geometry3k-68	6	如图所示，AD=5，BC=32，CD=12，AC垂直于BC，BD垂直于CD，三角形ACB相似于三角形CDB。求△ACB的周长。	As shown in the diagram, AD=5, BC=32, CD=12, AC⊥BC, BD⊥CD, triangle ACB is similar to triangle CDB.. Find the perimeter of triangle ACB.	68.png	[ "Shape(AC,CD,DA)", "Shape(DC,CB,BD)", "Collinear(ADB)" ]	[ "Equal(LengthOfLine(AD),5)", "Equal(LengthOfLine(BC),32)", "Equal(LengthOfLine(CD),12)", "PerpendicularBetweenLine(AC,BC)", "PerpendicularBetweenLine(BD,CD)", "SimilarBetweenTriangle(ACB,CDB)" ]	[ "PerpendicularBetweenLine(AC,BC)", "PerpendicularBetweenLine(BD,CD)" ]	Value(PerimeterOfTriangle(ACB))	sqrt(1193)+45	[ "adjacent_complementary_angle(1,BDC,CDA)", "right_triangle_judgment_angle(1,CDA)", "right_triangle_judgment_angle(1,ACB)", "right_triangle_property_pythagorean(1,CDA)", "right_triangle_property_pythagorean(1,ACB)", "triangle_perimeter_formula(1,ACB)" ]	{"START": ["adjacent_complementary_angle(1,BDC,CDA)", "right_triangle_judgment_angle(1,ACB)", "triangle_perimeter_formula(1,ACB)"], "adjacent_complementary_angle(1,BDC,CDA)": ["right_triangle_judgment_angle(1,CDA)"], "right_triangle_judgment_angle(1,ACB)": ["right_triangle_property_pythagorean(1,ACB)"], "right_triangle_judgment_angle(1,CDA)": ["right_triangle_property_pythagorean(1,CDA)"]}
69	XiaokaiZhang_2023-03-12	Geometry3k-69	2	如图所示，∠DEF=25°，∠GFD=65°，EG垂直于DG。求∠FDG的大小。	As shown in the diagram, ∠DEF=25°, ∠GFD=65°, EG⊥DG. Find the measure of ∠FDG.	69.png	[ "Shape(DE,EG,GD)", "Shape(DG,GF,FD)", "Collinear(EGF)" ]	[ "Equal(MeasureOfAngle(DEF),25)", "Equal(MeasureOfAngle(GFD),65)", "PerpendicularBetweenLine(EG,DG)" ]	[ "Equal(MeasureOfAngle(DEF),25)", "Equal(MeasureOfAngle(GFD),65)", "PerpendicularBetweenLine(EG,DG)" ]	Value(MeasureOfAngle(FDG))	25	[ "adjacent_complementary_angle(1,EGD,DGF)", "triangle_property_angle_sum(1,DGF)" ]	{"START": ["adjacent_complementary_angle(1,EGD,DGF)", "triangle_property_angle_sum(1,DGF)"]}
70	XiaokaiZhang_2023-04-02	Geometry3k-70	3	如图所示，JK=12，LK=2，ML=x，MN=6。求x的值。	As shown in the diagram, JK=12, LK=2, ML=x, MN=6. Find the value of x.	70.png	[ "Shape(AKJ,JK)", "Shape(KJ,AJN,NM,AMK)", "Shape(AMK,ML,LK)", "Shape(ANM,MN)", "Collinear(LKJ)", "Collinear(LMN)", "Cocircular(A,KJNM)" ]	[ "Equal(LengthOfLine(JK),12)", "Equal(LengthOfLine(LK),2)", "Equal(LengthOfLine(ML),x)", "Equal(LengthOfLine(MN),6)" ]	[ "Equal(LengthOfLine(JK),12)", "Equal(LengthOfLine(LK),2)", "Equal(LengthOfLine(ML),x)", "Equal(LengthOfLine(MN),6)" ]	Value(x)	-3+sqrt(37)	[ "circle_property_circular_power_segment_and_segment_line(1,LKJ,LMN,A)", "line_addition(1,LK,KJ)", "line_addition(1,LM,MN)" ]	{"START": ["circle_property_circular_power_segment_and_segment_line(1,LKJ,LMN,A)", "line_addition(1,LK,KJ)", "line_addition(1,LM,MN)"]}
71	XiaokaiZhang_2023-03-12	Geometry3k-71	1	如图所示，∠FHE=15*x°，三角形EFG为等边三角形，EH平分∠GEF。求x的值。	As shown in the diagram, ∠FHE=15*x°, △EFG is an equilateral △, EH is the angle bisector of ∠GEF. Find the value of x.	71.png	[ "Shape(EF,FH,HE)", "Shape(EH,HG,GE)", "Collinear(FHG)" ]	[ "Equal(MeasureOfAngle(FHE),15*x)", "EquilateralTriangle(EFG)", "IsBisectorOfAngle(EH,GEF)" ]	[ "Equal(MeasureOfAngle(FHE),15*x)" ]	Value(x)	6	[ "isosceles_triangle_property_line_coincidence(3,EFG,H)" ]	{"START": ["isosceles_triangle_property_line_coincidence(3,EFG,H)"]}
72	XiaokaiZhang_2023-04-02	Geometry3k-72	4	如图所示，∠TYZ=52°，∠ZYX=38°，TY垂直于XY，XW垂直于TW，YX⊥WX，YZ垂直于TZ。求∠WTZ的大小。	As shown in the diagram, ∠TYZ=52°, ∠ZYX=38°, TY is perpendicular to XY, XW is perpendicular to TW, YX⊥WX, YZ is perpendicular to TZ. Find the measure of ∠WTZ.	72.png	[ "Shape(TY,YZ,ZT)", "Shape(TZ,ZW,WT)", "Shape(ZY,YX,XW,WZ)", "Collinear(YZW)" ]	[ "Equal(MeasureOfAngle(TYZ),52)", "Equal(MeasureOfAngle(ZYX),38)", "PerpendicularBetweenLine(TY,XY)", "PerpendicularBetweenLine(XW,TW)", "PerpendicularBetweenLine(YX,WX)", "PerpendicularBetweenLine(YZ,TZ)" ]	[ "Equal(MeasureOfAngle(TYZ),52)", "Equal(MeasureOfAngle(ZYX),38)", "PerpendicularBetweenLine(TY,XY)", "PerpendicularBetweenLine(XW,TW)", "PerpendicularBetweenLine(YX,WX)", "PerpendicularBetweenLine(YZ,TZ)" ]	Value(MeasureOfAngle(WTZ))	52	[ "triangle_property_angle_sum(1,WYX)", "angle_addition(1,XWY,YWT)", "adjacent_complementary_angle(1,YZT,TZW)", "triangle_property_angle_sum(1,WTZ)" ]	{"START": ["triangle_property_angle_sum(1,WYX)", "angle_addition(1,XWY,YWT)", "adjacent_complementary_angle(1,YZT,TZW)", "triangle_property_angle_sum(1,WTZ)"]}
73	XiaokaiZhang_2023-03-12	Geometry3k-73	8	如图所示，PQ=y，QR=x，SP=2，SR=4，PQ⊥RQ，RS⊥QS。求y的值。	As shown in the diagram, PQ=y, QR=x, SP=2, SR=4, PQ⊥RQ, RS is perpendicular to QS. Find the value of y.	73.png	[ "Shape(RS,SQ,QR)", "Shape(SP,PQ,QS)", "Collinear(RSP)" ]	[ "Equal(LengthOfLine(PQ),y)", "Equal(LengthOfLine(QR),x)", "Equal(LengthOfLine(SP),2)", "Equal(LengthOfLine(SR),4)", "PerpendicularBetweenLine(PQ,RQ)", "PerpendicularBetweenLine(RS,QS)" ]	[ "Equal(LengthOfLine(PQ),y)", "Equal(LengthOfLine(QR),x)", "Equal(LengthOfLine(SP),2)", "Equal(LengthOfLine(SR),4)", "PerpendicularBetweenLine(PQ,RQ)", "PerpendicularBetweenLine(RS,QS)" ]	Value(y)	2*sqrt(3)	[ "adjacent_complementary_angle(1,RSQ,QSP)", "right_triangle_judgment_angle(1,RSQ)", "right_triangle_judgment_angle(1,QSP)", "right_triangle_judgment_angle(1,PQR)", "right_triangle_property_pythagorean(1,RSQ)", "right_triangle_property_pythagorean(1,QSP)", "right_triangle_property_pythagorean(1,PQR)", "...	{"START": ["adjacent_complementary_angle(1,RSQ,QSP)", "right_triangle_judgment_angle(1,RSQ)", "right_triangle_judgment_angle(1,PQR)", "line_addition(1,RS,SP)"], "adjacent_complementary_angle(1,RSQ,QSP)": ["right_triangle_judgment_angle(1,QSP)"], "right_triangle_judgment_angle(1,PQR)": ["right_triangle_property_pythagorean(1,PQR)"], "right_triangle_judgment_angle(1,QSP)": ["right_triangle_property_pythagorean(1,QSP)"], "right_triangle_judgment_angle(1,RSQ)": ["right_triangle_property_pythagorean(1,RSQ)"]}
74	XiaokaiZhang_2023-04-02	Geometry3k-74	3	如图所示，AB=y，AC=12，AD=BD，∠CAB=x°，DB垂直于CB，四边形ADBC是正方形。求x的值。	As shown in the diagram, AB=y, AC=12, AD=BD, ∠CAB=x°, DB is perpendicular to CB, ADBC is a square. Find the value of x.	74.png	[ "Shape(AD,DB,BA)", "Shape(AB,BC,CA)" ]	[ "Equal(LengthOfLine(AB),y)", "Equal(LengthOfLine(AC),12)", "Equal(LengthOfLine(AD),LengthOfLine(BD))", "Equal(MeasureOfAngle(CAB),x)", "PerpendicularBetweenLine(DB,CB)", "Square(ADBC)" ]	[ "Equal(LengthOfLine(AB),y)", "Equal(LengthOfLine(AC),12)", "Equal(LengthOfLine(AD),LengthOfLine(BD))", "Equal(MeasureOfAngle(CAB),x)", "PerpendicularBetweenLine(DB,CB)" ]	Value(x)	45	[ "isosceles_triangle_judgment_line_equal(1,CAB)", "isosceles_triangle_property_angle_equal(1,CAB)", "triangle_property_angle_sum(1,CAB)" ]	{"START": ["isosceles_triangle_judgment_line_equal(1,CAB)", "triangle_property_angle_sum(1,CAB)"], "isosceles_triangle_judgment_line_equal(1,CAB)": ["isosceles_triangle_property_angle_equal(1,CAB)"]}
75	XiaokaiZhang_2023-03-12	Geometry3k-76	4	如图所示，AN=10，BC=30，CN=5，AC⊥NC。求△ABC的面积。	As shown in the diagram, AN=10, BC=30, CN=5, AC is perpendicular to NC. Find the area of △ABC.	75.png	[ "Shape(AB,BC,CA)", "Shape(AC,CN,NA)", "Collinear(BCN)" ]	[ "Equal(LengthOfLine(AN),10)", "Equal(LengthOfLine(BC),30)", "Equal(LengthOfLine(CN),5)", "PerpendicularBetweenLine(AC,NC)" ]	[ "Equal(LengthOfLine(AN),10)", "Equal(LengthOfLine(BC),30)", "Equal(LengthOfLine(CN),5)", "PerpendicularBetweenLine(AC,NC)" ]	Value(AreaOfTriangle(ABC))	75*sqrt(3)	[ "adjacent_complementary_angle(1,BCA,ACN)", "right_triangle_judgment_angle(1,ACN)", "right_triangle_property_pythagorean(1,ACN)", "triangle_area_formula_sine(1,CAB)" ]	{"START": ["adjacent_complementary_angle(1,BCA,ACN)", "right_triangle_judgment_angle(1,ACN)", "triangle_area_formula_sine(1,CAB)"], "right_triangle_judgment_angle(1,ACN)": ["right_triangle_property_pythagorean(1,ACN)"]}
76	XiaokaiZhang_2023-04-02	Geometry3k-77	1	如图所示，QT=5y，RT=x，ST=2y+12，TP=5*x-28，QR和PS是▱RQPS的一组对边。求x的值。	As shown in the diagram, QT=5y, RT=x, ST=2y+12, TP=5*x-28, quadrilateral RQPS is a ▱. Find the value of x.	76.png	[ "Shape(RQ,QT,TR)", "Shape(TQ,QP,PT)", "Shape(RT,TS,SR)", "Shape(TP,PS,ST)", "Collinear(RTP)", "Collinear(QTS)" ]	[ "Equal(LengthOfLine(QT),5y)", "Equal(LengthOfLine(RT),x)", "Equal(LengthOfLine(ST),2y+12)", "Equal(LengthOfLine(TP),5*x-28)", "Parallelogram(RQPS)" ]	[ "Equal(LengthOfLine(QT),5y)", "Equal(LengthOfLine(RT),x)", "Equal(LengthOfLine(ST),2y+12)", "Equal(LengthOfLine(TP),5*x-28)" ]	Value(x)	7	[ "parallelogram_property_diagonal_bisection(1,RQPS,T)" ]	{"START": ["parallelogram_property_diagonal_bisection(1,RQPS,T)"]}
77	XiaokaiZhang_2023-04-02	Geometry3k-78	3	如图所示，∠BGE=x°，∠CGD=135°，∠DGB=145°，∠EGC=x°。求x的值。	As shown in the diagram, ∠BGE=x°, ∠CGD=135°, ∠DGB=145°, ∠EGC=x°. Find the value of x.	77.png	[ "Shape(GDC,CG,GD)", "Shape(GCE,EG,GC)", "Shape(GEB,BG,GE)", "Shape(GBD,DG,GB)", "Cocircular(G,DCEB)" ]	[ "Equal(MeasureOfAngle(BGE),x)", "Equal(MeasureOfAngle(CGD),135)", "Equal(MeasureOfAngle(DGB),145)", "Equal(MeasureOfAngle(EGC),x)" ]	[ "Equal(MeasureOfAngle(BGE),x)", "Equal(MeasureOfAngle(CGD),135)", "Equal(MeasureOfAngle(DGB),145)", "Equal(MeasureOfAngle(EGC),x)" ]	Value(x)	40	[ "angle_addition(1,CGD,DGB)", "angle_addition(1,BGE,EGC)", "round_angle(1,BGC,CGB)" ]	{"START": ["angle_addition(1,CGD,DGB)", "angle_addition(1,BGE,EGC)", "round_angle(1,BGC,CGB)"]}
78	XiaokaiZhang_2023-04-02	Geometry3k-79	1	如图所示，DE=6x-12，FE=4y，GD=6y-42，GF=2x+36，四边形EDGF是▱。求y的值。	As shown in the diagram, DE=6x-12, FE=4y, GD=6y-42, GF=2x+36, EDGF is a ▱. Find the value of y.	78.png	[ "Shape(ED,DG,GF,FE)" ]	[ "Equal(LengthOfLine(DE),6x-12)", "Equal(LengthOfLine(FE),4y)", "Equal(LengthOfLine(GD),6y-42)", "Equal(LengthOfLine(GF),2x+36)", "Parallelogram(EDGF)" ]	[ "Equal(LengthOfLine(DE),6x-12)", "Equal(LengthOfLine(FE),4y)", "Equal(LengthOfLine(GD),6y-42)", "Equal(LengthOfLine(GF),2x+36)" ]	Value(y)	21	[ "parallelogram_property_opposite_line_equal(1,DGFE)" ]	{"START": ["parallelogram_property_opposite_line_equal(1,DGFE)"]}
79	XiaokaiZhang_2023-04-02	Geometry3k-80	1	如图所示，BA=5，BC=12，DB=10，EB=x。求x的值。	As shown in the diagram, BA=5, BC=12, DB=10, EB=x. Find the value of x.	79.png	[ "Shape(ODA,AB,BD)", "Shape(OAE,EB,BA)", "Shape(OEC,CB,BE)", "Shape(OCD,DB,BC)", "Collinear(ABC)", "Collinear(EBD)", "Cocircular(O,AECD)" ]	[ "Equal(LengthOfLine(BA),5)", "Equal(LengthOfLine(BC),12)", "Equal(LengthOfLine(DB),10)", "Equal(LengthOfLine(EB),x)" ]	[ "Equal(LengthOfLine(BA),5)", "Equal(LengthOfLine(BC),12)", "Equal(LengthOfLine(DB),10)", "Equal(LengthOfLine(EB),x)" ]	Value(x)	6	[ "circle_property_circular_power_chord_and_chord(1,ABC,EBD,O)" ]	{"START": ["circle_property_circular_power_chord_and_chord(1,ABC,EBD,O)"]}
80	XiaokaiZhang_2023-03-12	Geometry3k-81	1	如图所示，BC=x，BQ=6，QC=8。求x的值。	As shown in the diagram, BC=x, BQ=6, QC=8. Find the value of x.	80.png	[ "Shape(AD,DB,BC,CA)", "Shape(DQ,QB,BD)", "Collinear(ADQ)", "Collinear(QBC)" ]	[ "Equal(LengthOfLine(BC),x)", "Equal(LengthOfLine(BQ),6)", "Equal(LengthOfLine(QC),8)" ]	[ "Equal(LengthOfLine(BC),x)", "Equal(LengthOfLine(BQ),6)", "Equal(LengthOfLine(QC),8)" ]	Value(x)	2	[ "line_addition(1,QB,BC)" ]	{"START": ["line_addition(1,QB,BC)"]}
81	XiaokaiZhang_2023-04-02	Geometry3k-82	2	如图所示，∠DEF=5x°，∠FDE=5x°，∠GFE=9*x+7°。求∠GFE的大小。	As shown in the diagram, ∠DEF=5x°, ∠FDE=5x°, ∠GFE=9*x+7°. Find the measure of ∠GFE.	81.png	[ "Shape(GF,FE)", "Shape(FD,DE,EF)", "Collinear(GFD)" ]	[ "Equal(MeasureOfAngle(DEF),5x)", "Equal(MeasureOfAngle(FDE),5x)", "Equal(MeasureOfAngle(GFE),9*x+7)" ]	[ "Equal(MeasureOfAngle(DEF),5x)", "Equal(MeasureOfAngle(FDE),5x)", "Equal(MeasureOfAngle(GFE),9*x+7)" ]	Value(MeasureOfAngle(GFE))	70	[ "adjacent_complementary_angle(1,GFE,EFD)", "triangle_property_angle_sum(1,FDE)" ]	{"START": ["adjacent_complementary_angle(1,GFE,EFD)", "triangle_property_angle_sum(1,FDE)"]}
82	XiaokaiZhang_2023-04-02	Geometry3k-83	9	如图所示，AE=12，BE=12，CE=17，DE=17，DE垂直于AE。求四边形ADBC的面积。	As shown in the diagram, AE=12, BE=12, CE=17, DE=17, DE⊥AE. Find the area of ADBC.	82.png	[ "Shape(AD,DE,EA)", "Shape(AE,EC,CA)", "Shape(DB,BE,ED)", "Shape(EB,BC,CE)", "Collinear(DEC)", "Collinear(AEB)" ]	[ "Equal(LengthOfLine(AE),12)", "Equal(LengthOfLine(BE),12)", "Equal(LengthOfLine(CE),17)", "Equal(LengthOfLine(DE),17)", "PerpendicularBetweenLine(DE,AE)" ]	[ "Equal(LengthOfLine(AE),12)", "Equal(LengthOfLine(BE),12)", "Equal(LengthOfLine(CE),17)", "Equal(LengthOfLine(DE),17)", "PerpendicularBetweenLine(DE,AE)" ]	Value(AreaOfQuadrilateral(ADBC))	408	[ "perpendicular_bisector_judgment_per_and_mid(1,AE,DC)", "perpendicular_bisector_property_distance_equal(1,AE,DC)", "vertical_angle(1,DEA,CEB)", "perpendicular_bisector_judgment_per_and_mid(1,BE,CD)", "perpendicular_bisector_property_distance_equal(1,BE,CD)", "kite_judgment_equal_and_equal(1,ADBC)", "lin...	{"START": ["perpendicular_bisector_judgment_per_and_mid(1,AE,DC)", "vertical_angle(1,DEA,CEB)", "line_addition(1,DE,EC)", "line_addition(1,AE,EB)"], "kite_judgment_equal_and_equal(1,ADBC)": ["kite_area_formula_diagonal(1,ADBC)"], "perpendicular_bisector_judgment_per_and_mid(1,AE,DC)": ["perpendicular_bisector_property_distance_equal(1,AE,DC)", "perpendicular_bisector_judgment_per_and_mid(1,BE,CD)"], "perpendicular_bisector_judgment_per_and_mid(1,BE,CD)": ["perpendicular_bisector_property_distance_equal(1,BE,CD)"], "perpendicular_bisector_property_distance_equal(1,AE,DC)": ["kite_judgment_equal_and_equal(1,ADBC)"], "perpendicular_bisector_property_distance_equal(1,BE,CD)": ["kite_judgment_equal_and_equal(1,ADBC)"], "vertical_angle(1,DEA,CEB)": ["perpendicular_bisector_judgment_per_and_mid(1,BE,CD)"]}
83	XiaokaiZhang_2023-04-02	Geometry3k-84	0	如图所示，JL=y+4/5，LC=2y-11/5，MI=12-3x，TM=10-2*x，TM=MI，JT平行于LM，LM平行于CI。求x的值。	As shown in the diagram, JL=y+4/5, LC=2y-11/5, MI=12-3x, TM=10-2*x, TM=MI, JT∥LM, LM∥CI. Find the value of x.	83.png	[ "Shape(JL,LM,MT,TJ)", "Shape(LC,CI,IM,ML)", "Collinear(JLC)", "Collinear(TMI)" ]	[ "Equal(LengthOfLine(JL),y+4/5)", "Equal(LengthOfLine(LC),2y-11/5)", "Equal(LengthOfLine(MI),12-3x)", "Equal(LengthOfLine(TM),10-2*x)", "Equal(LengthOfLine(TM),LengthOfLine(MI))", "ParallelBetweenLine(JT,LM)", "ParallelBetweenLine(LM,CI)" ]	[ "Equal(LengthOfLine(JL),y+4/5)", "Equal(LengthOfLine(LC),2y-11/5)", "Equal(LengthOfLine(MI),12-3x)", "Equal(LengthOfLine(TM),10-2*x)", "Equal(LengthOfLine(TM),LengthOfLine(MI))", "ParallelBetweenLine(JT,LM)", "ParallelBetweenLine(LM,CI)" ]	Value(x)	2	[]	{"START": []}
84	XiaokaiZhang_2023-03-12	Geometry3k-85	3	如图所示，AB=32，AD=DC，BC=2*x-3，EF=12，EH=HG，FG=x-5，∠BCD=∠FGH，∠DAB=∠HEF。求x的值。	As shown in the diagram, AB=32, AD=DC, BC=2*x-3, EF=12, EH=HG, FG=x-5, ∠BCD=∠FGH, ∠DAB=∠HEF. Find the value of x.	84.png	[ "Shape(EF,FH,HE)", "Shape(HF,FG,GH)", "Shape(AB,BD,DA)", "Shape(DB,BC,CD)", "Collinear(EHG)", "Collinear(ADC)" ]	[ "Equal(LengthOfLine(AB),32)", "Equal(LengthOfLine(AD),LengthOfLine(DC))", "Equal(LengthOfLine(BC),2*x-3)", "Equal(LengthOfLine(EF),12)", "Equal(LengthOfLine(EH),LengthOfLine(HG))", "Equal(LengthOfLine(FG),x-5)", "Equal(MeasureOfAngle(BCD),MeasureOfAngle(FGH))", "Equal(MeasureOfAngle(DAB),MeasureOfAngl...	[ "Equal(LengthOfLine(AB),32)", "Equal(LengthOfLine(AD),LengthOfLine(DC))", "Equal(LengthOfLine(BC),2*x-3)", "Equal(LengthOfLine(EF),12)", "Equal(LengthOfLine(EH),LengthOfLine(HG))", "Equal(LengthOfLine(FG),x-5)", "Equal(MeasureOfAngle(BCD),MeasureOfAngle(FGH))", "Equal(MeasureOfAngle(DAB),MeasureOfAngl...	Value(x)	31/2	[ "similar_triangle_judgment_aa(1,FGE,BCA)", "similar_triangle_property_line_ratio(1,EFG,ABC)", "similar_triangle_property_line_ratio(1,GEF,CAB)" ]	{"START": ["similar_triangle_judgment_aa(1,FGE,BCA)"], "similar_triangle_judgment_aa(1,FGE,BCA)": ["similar_triangle_property_line_ratio(1,GEF,CAB)", "similar_triangle_property_line_ratio(1,EFG,ABC)"]}
85	XiaokaiZhang_2023-04-02	Geometry3k-86	0	如图所示，∠ABC=110°。求∠ABC的大小。	As shown in the diagram, ∠ABC=110°. Find the measure of ∠ABC.	85.png	[ "Shape(AB,BC)" ]	[ "Equal(MeasureOfAngle(ABC),110)" ]	[ "Equal(MeasureOfAngle(ABC),110)" ]	Value(MeasureOfAngle(ABC))	110	[]	{"START": []}
86	XiaokaiZhang_2023-04-02	Geometry3k-87	5	如图所示，NP=2x-30，NR=2x+10，NMRQ是长方形。求直线MP的长度。	As shown in the diagram, NP=2x-30, NR=2x+10, NMRQ is a rectangle. Find the length of line MP.	86.png	[ "Shape(NM,MP,PN)", "Shape(PM,MR,RP)", "Shape(NP,PQ,QN)", "Shape(QP,PR,RQ)", "Collinear(NPR)", "Collinear(MPQ)" ]	[ "Equal(LengthOfLine(NP),2x-30)", "Equal(LengthOfLine(NR),2x+10)", "Rectangle(NMRQ)" ]	[]	Value(LengthOfLine(MP))	40	[ "parallelogram_property_diagonal_bisection(1,NMRQ,P)", "line_addition(1,NP,PR)", "parallelogram_property_diagonal_bisection(1,MRQN,P)", "rectangle_property_diagonal_equal(1,NMRQ)", "line_addition(1,MP,PQ)" ]	{"START": ["parallelogram_property_diagonal_bisection(1,NMRQ,P)", "line_addition(1,NP,PR)", "parallelogram_property_diagonal_bisection(1,MRQN,P)", "rectangle_property_diagonal_equal(1,NMRQ)", "line_addition(1,MP,PQ)"]}
87	XiaokaiZhang_2023-04-02	Geometry3k-88	2	如图所示，BCAW的面积为500，BW=30，DG=15，BCAW与DEFG相似。求四边形DEFG的面积。	As shown in the diagram, the area of BCAW is 500, BW=30, DG=15, quadrilateral BCAW is similar to quadrilateral DEFG. Find the area of DEFG.	87.png	[ "Shape(BC,CA,AW,WB)", "Shape(DE,EF,FG,GD)" ]	[ "Equal(AreaOfQuadrilateral(BCAW),500)", "Equal(LengthOfLine(BW),30)", "Equal(LengthOfLine(DG),15)", "SimilarBetweenQuadrilateral(BCAW,DEFG)" ]	[ "Equal(AreaOfQuadrilateral(BCAW),500)", "Equal(LengthOfLine(BW),30)", "Equal(LengthOfLine(DG),15)" ]	Value(AreaOfQuadrilateral(DEFG))	125	[ "similar_quadrilateral_property_line_ratio(1,WBCA,GDEF)", "similar_quadrilateral_property_area_square_ratio(1,BCAW,DEFG)" ]	{"START": ["similar_quadrilateral_property_line_ratio(1,WBCA,GDEF)", "similar_quadrilateral_property_area_square_ratio(1,BCAW,DEFG)"]}
88	XiaokaiZhang_2023-04-02	Geometry3k-89	3	如图所示，SR=TS，∠TAS=93°，弧ARS的角度为x，⊙A的圆心为A。求x的值。	As shown in the diagram, SR=TS, ∠TAS=93°, the measure of arc ARS is x, the center of ⊙A is A. Find the value of x.	88.png	[ "Shape(ATR,RS,SA,AT)", "Shape(ARS,SR)", "Shape(AS,ST,TA)", "Shape(AST,TS)", "Cocircular(A,RST)" ]	[ "Equal(LengthOfLine(SR),LengthOfLine(TS))", "Equal(MeasureOfAngle(TAS),93)", "Equal(MeasureOfArc(ARS),x)", "IsCentreOfCircle(A,A)" ]	[ "Equal(LengthOfLine(SR),LengthOfLine(TS))", "Equal(MeasureOfAngle(TAS),93)", "Equal(MeasureOfArc(ARS),x)", "IsCentreOfCircle(A,A)" ]	Value(x)	93	[ "congruent_arc_judgment_chord_equal(1,ARS,AST)", "congruent_arc_property_measure_equal(1,ARS,AST)", "arc_property_center_angle(1,AST,A)" ]	{"START": ["congruent_arc_judgment_chord_equal(1,ARS,AST)", "arc_property_center_angle(1,AST,A)"], "congruent_arc_judgment_chord_equal(1,ARS,AST)": ["congruent_arc_property_measure_equal(1,ARS,AST)"]}
89	XiaokaiZhang_2023-04-02	Geometry3k-90	1	如图所示，∠DGH=64°，IL∥BN，WJ∥AK。求∠JGD的大小。	As shown in the diagram, ∠DGH=64°, IL is parallel to BN, WJ∥AK. Find the measure of ∠JGD.	89.png	[ "Shape(AB,BC)", "Shape(CB,BD)", "Shape(BD,DE)", "Shape(ED,DF)", "Shape(FD,DG)", "Shape(DG,GH)", "Shape(HG,GI)", "Shape(IG,GJ)", "Shape(GJ,JK)", "Shape(KJ,JL)", "Shape(LJ,JB)", "Shape(JB,BA)", "Shape(BJ,JG,GD,DB)", "Collinear(ABDF)", "Collinear(LJGH)", "Collinear(CBJK)", "Collinear(ED...	[ "Equal(MeasureOfAngle(DGH),64)", "ParallelBetweenLine(IL,BN)", "ParallelBetweenLine(WJ,AK)" ]	[ "Equal(MeasureOfAngle(DGH),64)", "ParallelBetweenLine(IL,BN)", "ParallelBetweenLine(WJ,AK)" ]	Value(MeasureOfAngle(JGD))	116	[ "adjacent_complementary_angle(1,JGD,DGH)" ]	{"START": ["adjacent_complementary_angle(1,JGD,DGH)"]}
90	XiaokaiZhang_2023-03-12	Geometry3k-91	3	如图所示，BA=3，BD=x-1，CE=x+2，EF=8，∠GAB=∠EFG，AB⊥CB，DE垂直于FE。求直线BD的长度。	As shown in the diagram, BA=3, BD=x-1, CE=x+2, EF=8, ∠GAB=∠EFG, AB is perpendicular to CB, DE is perpendicular to FE. Find the length of line BD.	90.png	[ "Shape(AB,BC,CG,GA)", "Shape(GC,CD,DG)", "Shape(GD,DE,EF,FG)", "Collinear(AGD)", "Collinear(CGF)", "Collinear(BCDE)" ]	[ "Equal(LengthOfLine(BA),3)", "Equal(LengthOfLine(BD),x-1)", "Equal(LengthOfLine(CE),x+2)", "Equal(LengthOfLine(EF),8)", "Equal(MeasureOfAngle(GAB),MeasureOfAngle(EFG))", "PerpendicularBetweenLine(AB,CB)", "PerpendicularBetweenLine(DE,FE)" ]	[ "Equal(LengthOfLine(BA),3)", "Equal(LengthOfLine(BD),x-1)", "Equal(LengthOfLine(CE),x+2)", "Equal(LengthOfLine(EF),8)", "Equal(MeasureOfAngle(GAB),MeasureOfAngle(EFG))", "PerpendicularBetweenLine(AB,CB)", "PerpendicularBetweenLine(DE,FE)" ]	Value(LengthOfLine(BD))	9/5	[ "mirror_similar_triangle_judgment_aa(1,DAB,CEF)", "mirror_similar_triangle_property_line_ratio(1,DAB,CEF)", "mirror_similar_triangle_property_line_ratio(1,ABD,FCE)" ]	{"START": ["mirror_similar_triangle_judgment_aa(1,DAB,CEF)"], "mirror_similar_triangle_judgment_aa(1,DAB,CEF)": ["mirror_similar_triangle_property_line_ratio(1,DAB,CEF)", "mirror_similar_triangle_property_line_ratio(1,ABD,FCE)"]}
91	XiaokaiZhang_2023-03-12	Geometry3k-92	1	如图所示，WX=a+12，WZ=4*a-15，XY=YZ，WY垂直平分AB。求直线WX的长度。	As shown in the diagram, WX=a+12, WZ=4*a-15, XY=YZ, WY is the perpendicular bisector of ZX. Find the length of line WX.	91.png	[ "Shape(WZ,ZY,YW)", "Shape(WY,YX,XW)", "Collinear(ZYX)" ]	[ "Equal(LengthOfLine(WX),a+12)", "Equal(LengthOfLine(WZ),4*a-15)", "Equal(LengthOfLine(XY),LengthOfLine(YZ))", "IsPerpendicularBisectorOfLine(WY,ZX)" ]	[ "Equal(LengthOfLine(XY),LengthOfLine(YZ))" ]	Value(LengthOfLine(WX))	21	[ "perpendicular_bisector_property_distance_equal(1,WY,ZX)" ]	{"START": ["perpendicular_bisector_property_distance_equal(1,WY,ZX)"]}
92	XiaokaiZhang_2023-04-02	Geometry3k-93	3	如图所示，BC=y，BD=12，CD=12，∠CBD=x°，BD⊥CD。求x的值。	As shown in the diagram, BC=y, BD=12, CD=12, ∠CBD=x°, BD⊥CD. Find the value of x.	92.png	[ "Shape(AB,BC,CA)", "Shape(CB,BD,DC)" ]	[ "Equal(LengthOfLine(BC),y)", "Equal(LengthOfLine(BD),12)", "Equal(LengthOfLine(CD),12)", "Equal(MeasureOfAngle(CBD),x)", "PerpendicularBetweenLine(BD,CD)" ]	[ "Equal(LengthOfLine(BC),y)", "Equal(LengthOfLine(BD),12)", "Equal(LengthOfLine(CD),12)", "Equal(MeasureOfAngle(CBD),x)", "PerpendicularBetweenLine(BD,CD)" ]	Value(x)	45	[ "isosceles_triangle_judgment_line_equal(1,DCB)", "isosceles_triangle_property_angle_equal(1,DCB)", "triangle_property_angle_sum(1,DCB)" ]	{"START": ["isosceles_triangle_judgment_line_equal(1,DCB)", "triangle_property_angle_sum(1,DCB)"], "isosceles_triangle_judgment_line_equal(1,DCB)": ["isosceles_triangle_property_angle_equal(1,DCB)"]}
93	XiaokaiZhang_2023-04-02	Geometry3k-94	1	如图所示，∠DHB=38°，∠FDA=52°，HB垂直于DB。求∠HDF的大小。	As shown in the diagram, ∠DHB=38°, ∠FDA=52°, HB is perpendicular to DB. Find the measure of ∠HDF.	93.png	[ "Shape(CH,HI)", "Shape(IH,HD)", "Shape(HD,DF)", "Shape(FD,DA)", "Shape(AD,DB)", "Shape(DB,BE)", "Shape(EB,BG)", "Shape(GB,BH)", "Shape(BH,HC)", "Shape(HB,BD,DH)", "Collinear(CHDA)", "Collinear(IHBE)", "Collinear(GBDF)" ]	[ "Equal(MeasureOfAngle(DHB),38)", "Equal(MeasureOfAngle(FDA),52)", "PerpendicularBetweenLine(HB,DB)" ]	[ "Equal(MeasureOfAngle(DHB),38)", "Equal(MeasureOfAngle(FDA),52)", "PerpendicularBetweenLine(HB,DB)" ]	Value(MeasureOfAngle(HDF))	128	[ "adjacent_complementary_angle(1,HDF,FDA)" ]	{"START": ["adjacent_complementary_angle(1,HDF,FDA)"]}
94	XiaokaiZhang_2023-04-02	Geometry3k-95	13	如图所示，⌒DBC的角度为170，D是圆D的圆心。求∠CAB的大小。	As shown in the diagram, the measure of arc DBC is 170, D is the center of circle D. Find the measure of ∠CAB.	94.png	[ "Shape(DCA,AC)", "Shape(DC,CA,AD)", "Shape(DA,AB,BD)", "Shape(DAB,BA)", "Shape(DB,DBC,CD)", "Cocircular(D,CAB)" ]	[ "Equal(MeasureOfArc(DBC),170)", "IsCentreOfCircle(D,D)" ]	[ "Equal(MeasureOfArc(DBC),170)", "IsCentreOfCircle(D,D)" ]	Value(MeasureOfAngle(CAB))	85	[ "arc_property_center_angle(1,DBC,D)", "round_angle(1,CDB,BDC)", "radius_of_circle_property_length_equal(1,DC,D)", "radius_of_circle_property_length_equal(1,DA,D)", "radius_of_circle_property_length_equal(1,DB,D)", "isosceles_triangle_judgment_line_equal(1,DCA)", "isosceles_triangle_property_angle_equal(...	{"START": ["arc_property_center_angle(1,DBC,D)", "round_angle(1,CDB,BDC)", "radius_of_circle_property_length_equal(1,DC,D)", "radius_of_circle_property_length_equal(1,DA,D)", "radius_of_circle_property_length_equal(1,DB,D)", "angle_addition(1,CAD,DAB)", "angle_addition(1,BDA,ADC)", "triangle_property_angle_sum(1,DCA)", "triangle_property_angle_sum(1,DAB)"], "isosceles_triangle_judgment_line_equal(1,DAB)": ["isosceles_triangle_property_angle_equal(1,DAB)"], "isosceles_triangle_judgment_line_equal(1,DCA)": ["isosceles_triangle_property_angle_equal(1,DCA)"], "radius_of_circle_property_length_equal(1,DA,D)": ["isosceles_triangle_judgment_line_equal(1,DCA)", "isosceles_triangle_judgment_line_equal(1,DAB)"], "radius_of_circle_property_length_equal(1,DB,D)": ["isosceles_triangle_judgment_line_equal(1,DAB)"], "radius_of_circle_property_length_equal(1,DC,D)": ["isosceles_triangle_judgment_line_equal(1,DCA)"]}
95	XiaokaiZhang_2023-04-02	Geometry3k-96	1	如图所示，∠PNO=56°，弧BMN的角度为70。求弧BOP的角度。	As shown in the diagram, ∠PNO=56°, the measure of arc BMN is 70. Find the measure of arc BOP.	95.png	[ "Shape(BPM,MP)", "Shape(BMN,NP,PM)", "Shape(PN,NO,BOP)", "Shape(BNO,ON)", "Cocircular(B,PMNO)" ]	[ "Equal(MeasureOfAngle(PNO),56)", "Equal(MeasureOfArc(BMN),70)" ]	[ "Equal(MeasureOfAngle(PNO),56)", "Equal(MeasureOfArc(BMN),70)" ]	Value(MeasureOfArc(BOP))	112	[ "arc_property_circumference_angle_external(1,BOP,N)" ]	{"START": ["arc_property_circumference_angle_external(1,BOP,N)"]}
96	XiaokaiZhang_2023-04-02	Geometry3k-97	1	如图所示，∠ACB=3y+36°，∠BDA=9y-12°，∠CBD=12x+72°，∠DAC=25x+20°，四边形BDAC是平行四边形。求x的值。	As shown in the diagram, ∠ACB=3y+36°, ∠BDA=9y-12°, ∠CBD=12x+72°, ∠DAC=25x+20°, BC and DA are opposite sides of the ▱ BDAC. Find the value of x.	96.png	[ "Shape(BD,DA,AC,CB)" ]	[ "Equal(MeasureOfAngle(ACB),3y+36)", "Equal(MeasureOfAngle(BDA),9y-12)", "Equal(MeasureOfAngle(CBD),12x+72)", "Equal(MeasureOfAngle(DAC),25x+20)", "Parallelogram(BDAC)" ]	[ "Equal(MeasureOfAngle(ACB),3y+36)", "Equal(MeasureOfAngle(BDA),9y-12)", "Equal(MeasureOfAngle(CBD),12x+72)", "Equal(MeasureOfAngle(DAC),25x+20)" ]	Value(x)	4	[ "parallelogram_property_opposite_angle_equal(1,BDAC)" ]	{"START": ["parallelogram_property_opposite_angle_equal(1,BDAC)"]}
97	XiaokaiZhang_2023-04-02	Geometry3k-98	1	如图所示，AD=11，BC=25，四边形BACD是风筝形。求BACD的面积。	As shown in the diagram, AD=11, BC=25, BACD is a kite. Find the area of BACD.	97.png	[ "Shape(BA,AO,OB)", "Shape(BO,OD,DB)", "Shape(AC,CO,OA)", "Shape(OC,CD,DO)", "Collinear(COB)", "Collinear(AOD)" ]	[ "Equal(LengthOfLine(AD),11)", "Equal(LengthOfLine(BC),25)", "Kite(BACD)" ]	[ "Equal(LengthOfLine(AD),11)", "Equal(LengthOfLine(BC),25)" ]	Value(AreaOfQuadrilateral(BACD))	275/2	[ "kite_area_formula_diagonal(1,BACD)" ]	{"START": ["kite_area_formula_diagonal(1,BACD)"]}
98	XiaokaiZhang_2023-04-02	Geometry3k-99	4	如图所示，∠CBD=55°，∠FBG=35°，圆B的圆心为B。求⌒BFA的角度。	As shown in the diagram, ∠CBD=55°, ∠FBG=35°, B is the center of ⊙B. Find the measure of arc BFA.	98.png	[ "Shape(BCA,AB,BC)", "Shape(BAG,GB,BA)", "Shape(BGF,FB,BG)", "Shape(BFD,DB,BF)", "Shape(BDC,CB,BD)", "Collinear(ABD)", "Collinear(CBG)", "Cocircular(B,CAGFD)" ]	[ "Equal(MeasureOfAngle(CBD),55)", "Equal(MeasureOfAngle(FBG),35)", "IsCentreOfCircle(B,B)" ]	[ "Equal(MeasureOfAngle(CBD),55)", "Equal(MeasureOfAngle(FBG),35)", "IsCentreOfCircle(B,B)" ]	Value(MeasureOfArc(BFA))	270	[ "vertical_angle(1,CBD,GBA)", "angle_addition(1,FBG,GBA)", "round_angle(1,FBA,ABF)", "arc_property_center_angle(1,BFA,B)" ]	{"START": ["vertical_angle(1,CBD,GBA)", "angle_addition(1,FBG,GBA)", "round_angle(1,FBA,ABF)", "arc_property_center_angle(1,BFA,B)"]}
99	XiaokaiZhang_2023-03-12	Geometry3k-100	3	如图所示，PQ=25*sqrt(3)，RQ=25，PQ垂直于RQ。求∠QRP的大小。	As shown in the diagram, PQ=25*sqrt(3), RQ=25, PQ⊥RQ. Find the measure of ∠QRP.	99.png	[ "Shape(PQ,QR,RP)" ]	[ "Equal(LengthOfLine(PQ),25*sqrt(3))", "Equal(LengthOfLine(RQ),25)", "PerpendicularBetweenLine(PQ,RQ)" ]	[ "Equal(LengthOfLine(PQ),25*sqrt(3))", "Equal(LengthOfLine(RQ),25)", "PerpendicularBetweenLine(PQ,RQ)" ]	Value(MeasureOfAngle(QRP))	60	[ "right_triangle_judgment_angle(1,PQR)", "right_triangle_property_pythagorean(1,PQR)", "cosine_theorem(1,RPQ)" ]	{"START": ["right_triangle_judgment_angle(1,PQR)", "cosine_theorem(1,RPQ)"], "right_triangle_judgment_angle(1,PQR)": ["right_triangle_property_pythagorean(1,PQR)"]}
100	XiaokaiZhang_2023-03-12	Geometry3k-101	8	如图所示，AB=z，AN=x，AY=5，YB=14，YN=y，BA垂直于YA，YN垂直于AN。求y的值。	As shown in the diagram, AB=z, AN=x, AY=5, YB=14, YN=y, BA⊥YA, YN is perpendicular to AN. Find the value of y.	100.png	[ "Shape(AY,YN,NA)", "Shape(AN,NB,BA)", "Collinear(YNB)" ]	[ "Equal(LengthOfLine(AB),z)", "Equal(LengthOfLine(AN),x)", "Equal(LengthOfLine(AY),5)", "Equal(LengthOfLine(YB),14)", "Equal(LengthOfLine(YN),y)", "PerpendicularBetweenLine(BA,YA)", "PerpendicularBetweenLine(YN,AN)" ]	[ "Equal(LengthOfLine(AB),z)", "Equal(LengthOfLine(AN),x)", "Equal(LengthOfLine(AY),5)", "Equal(LengthOfLine(YB),14)", "Equal(LengthOfLine(YN),y)", "PerpendicularBetweenLine(BA,YA)", "PerpendicularBetweenLine(YN,AN)" ]	Value(y)	25/14	[ "adjacent_complementary_angle(1,YNA,ANB)", "line_addition(1,YN,NB)", "right_triangle_judgment_angle(1,YNA)", "right_triangle_judgment_angle(1,ANB)", "right_triangle_judgment_angle(1,BAY)", "right_triangle_property_pythagorean(1,YNA)", "right_triangle_property_pythagorean(1,ANB)", "right_triangle_prope...	{"START": ["adjacent_complementary_angle(1,YNA,ANB)", "line_addition(1,YN,NB)", "right_triangle_judgment_angle(1,YNA)", "right_triangle_judgment_angle(1,BAY)"], "adjacent_complementary_angle(1,YNA,ANB)": ["right_triangle_judgment_angle(1,ANB)"], "right_triangle_judgment_angle(1,ANB)": ["right_triangle_property_pythagorean(1,ANB)"], "right_triangle_judgment_angle(1,BAY)": ["right_triangle_property_pythagorean(1,BAY)"], "right_triangle_judgment_angle(1,YNA)": ["right_triangle_property_pythagorean(1,YNA)"]}

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FormalGeo7k_v1

This dataset is a Hugging Face conversion of formalgeo7k_v1 from the official FormalGeo repository.

Dataset Sources

Repository: https://github.com/FormalGeo/FormalGeo
Local source folder in this conversion script: formalgeo7k_v1/
Problem source (from official metadata): Geometry3k, GeoQA, GeoQA+ and online resources.

Citation

@article{zhang2024fgeosss,
  title={FGeo-SSS: A Search-Based Symbolic Solver for Human-like Automated Geometric Reasoning},
  author={Zhang, Xiaokai and Zhu, Na and He, Yiming and Zou, Jia and Qin, Cheng and Li, Yang and Leng, Tuo},
  journal={Symmetry},
  volume={16},
  number={4},
  pages={404},
  year={2024}
}

Notes

This conversion keeps formal fields such as construction_cdl, text_cdl, image_cdl, and goal_cdl.
image is stored as a Hugging Face Image feature.

Downloads last month: 30

Size of downloaded dataset files:

94.1 MB

Size of the auto-converted Parquet files:

94.1 MB

Number of rows:

6,981