296069
If \(\triangle\text{ABC}=\triangle\text{PQR}\) then \(\angle\text{B}\) corresponds to.
1 \(\angle\text{P}\)
2 \(\angle\text{Q}\)
3 \(\angle\text{R}\)
4 \(\text{None of these}\)
Explanation:
\(\angle\text{Q}\) \(\triangle\text{ABC}=\triangle\text{PQR}\) Then \(\angle\text{A}=\angle\text{P}\) \(\angle\text{B}=\angle\text{Q}\) \(\angle\text{C}=\angle\text{R}\)
CONGRUENCE OF TRIANGLES
296070
Find this property of which congruence of two triangles. “Two triangles are congruent if two sides and the angle included between them in one of the triangles are equal to the corresponding sides the other angles included between them of the other triangle”
1 SSS
2 ASA
3 SAS
4 AAA
Explanation:
SAS This is the property of SAS.
CONGRUENCE OF TRIANGLES
296071
Are the following triangles congruent? 0
1 Yes
2 No
3 None of these
Explanation:
No By SSS congruency two triangles are not congruent.
CONGRUENCE OF TRIANGLES
296072
If in two triangles PQR and DEF, PR = EF QR = DE and PQ = FD then \(\triangle\text{PQR}\cong\triangle\)_____
1 FDE
2 DEF
3 FED
4 DFE
Explanation:
FDE Given: PR = EF, QR = DE and PQ = FD Now, In \(\triangle\text{PRQ}\) and \(\triangle\text{DEF}\) PR = EF QR = DE PQ = FD Thus, \(\triangle\text{PQR}\cong\triangle\text{F DE }\text{(SSS rule)}\)
296069
If \(\triangle\text{ABC}=\triangle\text{PQR}\) then \(\angle\text{B}\) corresponds to.
1 \(\angle\text{P}\)
2 \(\angle\text{Q}\)
3 \(\angle\text{R}\)
4 \(\text{None of these}\)
Explanation:
\(\angle\text{Q}\) \(\triangle\text{ABC}=\triangle\text{PQR}\) Then \(\angle\text{A}=\angle\text{P}\) \(\angle\text{B}=\angle\text{Q}\) \(\angle\text{C}=\angle\text{R}\)
CONGRUENCE OF TRIANGLES
296070
Find this property of which congruence of two triangles. “Two triangles are congruent if two sides and the angle included between them in one of the triangles are equal to the corresponding sides the other angles included between them of the other triangle”
1 SSS
2 ASA
3 SAS
4 AAA
Explanation:
SAS This is the property of SAS.
CONGRUENCE OF TRIANGLES
296071
Are the following triangles congruent? 0
1 Yes
2 No
3 None of these
Explanation:
No By SSS congruency two triangles are not congruent.
CONGRUENCE OF TRIANGLES
296072
If in two triangles PQR and DEF, PR = EF QR = DE and PQ = FD then \(\triangle\text{PQR}\cong\triangle\)_____
1 FDE
2 DEF
3 FED
4 DFE
Explanation:
FDE Given: PR = EF, QR = DE and PQ = FD Now, In \(\triangle\text{PRQ}\) and \(\triangle\text{DEF}\) PR = EF QR = DE PQ = FD Thus, \(\triangle\text{PQR}\cong\triangle\text{F DE }\text{(SSS rule)}\)
296069
If \(\triangle\text{ABC}=\triangle\text{PQR}\) then \(\angle\text{B}\) corresponds to.
1 \(\angle\text{P}\)
2 \(\angle\text{Q}\)
3 \(\angle\text{R}\)
4 \(\text{None of these}\)
Explanation:
\(\angle\text{Q}\) \(\triangle\text{ABC}=\triangle\text{PQR}\) Then \(\angle\text{A}=\angle\text{P}\) \(\angle\text{B}=\angle\text{Q}\) \(\angle\text{C}=\angle\text{R}\)
CONGRUENCE OF TRIANGLES
296070
Find this property of which congruence of two triangles. “Two triangles are congruent if two sides and the angle included between them in one of the triangles are equal to the corresponding sides the other angles included between them of the other triangle”
1 SSS
2 ASA
3 SAS
4 AAA
Explanation:
SAS This is the property of SAS.
CONGRUENCE OF TRIANGLES
296071
Are the following triangles congruent? 0
1 Yes
2 No
3 None of these
Explanation:
No By SSS congruency two triangles are not congruent.
CONGRUENCE OF TRIANGLES
296072
If in two triangles PQR and DEF, PR = EF QR = DE and PQ = FD then \(\triangle\text{PQR}\cong\triangle\)_____
1 FDE
2 DEF
3 FED
4 DFE
Explanation:
FDE Given: PR = EF, QR = DE and PQ = FD Now, In \(\triangle\text{PRQ}\) and \(\triangle\text{DEF}\) PR = EF QR = DE PQ = FD Thus, \(\triangle\text{PQR}\cong\triangle\text{F DE }\text{(SSS rule)}\)
NEET Test Series from KOTA - 10 Papers In MS WORD
WhatsApp Here
CONGRUENCE OF TRIANGLES
296069
If \(\triangle\text{ABC}=\triangle\text{PQR}\) then \(\angle\text{B}\) corresponds to.
1 \(\angle\text{P}\)
2 \(\angle\text{Q}\)
3 \(\angle\text{R}\)
4 \(\text{None of these}\)
Explanation:
\(\angle\text{Q}\) \(\triangle\text{ABC}=\triangle\text{PQR}\) Then \(\angle\text{A}=\angle\text{P}\) \(\angle\text{B}=\angle\text{Q}\) \(\angle\text{C}=\angle\text{R}\)
CONGRUENCE OF TRIANGLES
296070
Find this property of which congruence of two triangles. “Two triangles are congruent if two sides and the angle included between them in one of the triangles are equal to the corresponding sides the other angles included between them of the other triangle”
1 SSS
2 ASA
3 SAS
4 AAA
Explanation:
SAS This is the property of SAS.
CONGRUENCE OF TRIANGLES
296071
Are the following triangles congruent? 0
1 Yes
2 No
3 None of these
Explanation:
No By SSS congruency two triangles are not congruent.
CONGRUENCE OF TRIANGLES
296072
If in two triangles PQR and DEF, PR = EF QR = DE and PQ = FD then \(\triangle\text{PQR}\cong\triangle\)_____
1 FDE
2 DEF
3 FED
4 DFE
Explanation:
FDE Given: PR = EF, QR = DE and PQ = FD Now, In \(\triangle\text{PRQ}\) and \(\triangle\text{DEF}\) PR = EF QR = DE PQ = FD Thus, \(\triangle\text{PQR}\cong\triangle\text{F DE }\text{(SSS rule)}\)
0