296091
By which of the following criterion two triangles cannot be proved congruent?
1 AAA
2 SSS
3 SAS
4 ASA
Explanation:
AAA
CONGRUENCE OF TRIANGLES
296092
\(\triangle\text{ABC}\) is right triangle in which \(\angle\text{A}=90^\circ\) and AB = AC. The values of \(\angle\text{B}\) and \(\angle\text{C}\) will be
1 \(\angle\text{B}=\angle\text{C}=30^\circ\)
2 \(\angle\text{B}=\angle\text{C}=50^\circ\)
3 \(\angle\text{B}=\angle\text{C}=45^\circ\)
4 \(\angle\text{B}=\angle\text{C}=60^\circ\)
Explanation:
\(\angle\text{B}=\angle\text{C}=45^\circ\)
CONGRUENCE OF TRIANGLES
296093
\(\triangle\text{ABC}\) and \(\triangle\text{PQR}\) are congruent under the correspondence: ABC ↔ RPQ, then the part of \(\triangle\text{ABC}\) that correspond to PQ is.
1 AC
2 AB
3 BC
4 None of thsese
Explanation:
BC
CONGRUENCE OF TRIANGLES
296094
If ____sides of a triangle are respectively equal to the ____ sides of the other triangle, then the triangles are congruent:
1 Three
2 Two
3 One
4 None
Explanation:
Three If all the three sides of the triangle are equal to corresponding three sides of other triangle. Both the triangles will be congruent by SSS rule.
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CONGRUENCE OF TRIANGLES
296091
By which of the following criterion two triangles cannot be proved congruent?
1 AAA
2 SSS
3 SAS
4 ASA
Explanation:
AAA
CONGRUENCE OF TRIANGLES
296092
\(\triangle\text{ABC}\) is right triangle in which \(\angle\text{A}=90^\circ\) and AB = AC. The values of \(\angle\text{B}\) and \(\angle\text{C}\) will be
1 \(\angle\text{B}=\angle\text{C}=30^\circ\)
2 \(\angle\text{B}=\angle\text{C}=50^\circ\)
3 \(\angle\text{B}=\angle\text{C}=45^\circ\)
4 \(\angle\text{B}=\angle\text{C}=60^\circ\)
Explanation:
\(\angle\text{B}=\angle\text{C}=45^\circ\)
CONGRUENCE OF TRIANGLES
296093
\(\triangle\text{ABC}\) and \(\triangle\text{PQR}\) are congruent under the correspondence: ABC ↔ RPQ, then the part of \(\triangle\text{ABC}\) that correspond to PQ is.
1 AC
2 AB
3 BC
4 None of thsese
Explanation:
BC
CONGRUENCE OF TRIANGLES
296094
If ____sides of a triangle are respectively equal to the ____ sides of the other triangle, then the triangles are congruent:
1 Three
2 Two
3 One
4 None
Explanation:
Three If all the three sides of the triangle are equal to corresponding three sides of other triangle. Both the triangles will be congruent by SSS rule.
296091
By which of the following criterion two triangles cannot be proved congruent?
1 AAA
2 SSS
3 SAS
4 ASA
Explanation:
AAA
CONGRUENCE OF TRIANGLES
296092
\(\triangle\text{ABC}\) is right triangle in which \(\angle\text{A}=90^\circ\) and AB = AC. The values of \(\angle\text{B}\) and \(\angle\text{C}\) will be
1 \(\angle\text{B}=\angle\text{C}=30^\circ\)
2 \(\angle\text{B}=\angle\text{C}=50^\circ\)
3 \(\angle\text{B}=\angle\text{C}=45^\circ\)
4 \(\angle\text{B}=\angle\text{C}=60^\circ\)
Explanation:
\(\angle\text{B}=\angle\text{C}=45^\circ\)
CONGRUENCE OF TRIANGLES
296093
\(\triangle\text{ABC}\) and \(\triangle\text{PQR}\) are congruent under the correspondence: ABC ↔ RPQ, then the part of \(\triangle\text{ABC}\) that correspond to PQ is.
1 AC
2 AB
3 BC
4 None of thsese
Explanation:
BC
CONGRUENCE OF TRIANGLES
296094
If ____sides of a triangle are respectively equal to the ____ sides of the other triangle, then the triangles are congruent:
1 Three
2 Two
3 One
4 None
Explanation:
Three If all the three sides of the triangle are equal to corresponding three sides of other triangle. Both the triangles will be congruent by SSS rule.
296091
By which of the following criterion two triangles cannot be proved congruent?
1 AAA
2 SSS
3 SAS
4 ASA
Explanation:
AAA
CONGRUENCE OF TRIANGLES
296092
\(\triangle\text{ABC}\) is right triangle in which \(\angle\text{A}=90^\circ\) and AB = AC. The values of \(\angle\text{B}\) and \(\angle\text{C}\) will be
1 \(\angle\text{B}=\angle\text{C}=30^\circ\)
2 \(\angle\text{B}=\angle\text{C}=50^\circ\)
3 \(\angle\text{B}=\angle\text{C}=45^\circ\)
4 \(\angle\text{B}=\angle\text{C}=60^\circ\)
Explanation:
\(\angle\text{B}=\angle\text{C}=45^\circ\)
CONGRUENCE OF TRIANGLES
296093
\(\triangle\text{ABC}\) and \(\triangle\text{PQR}\) are congruent under the correspondence: ABC ↔ RPQ, then the part of \(\triangle\text{ABC}\) that correspond to PQ is.
1 AC
2 AB
3 BC
4 None of thsese
Explanation:
BC
CONGRUENCE OF TRIANGLES
296094
If ____sides of a triangle are respectively equal to the ____ sides of the other triangle, then the triangles are congruent:
1 Three
2 Two
3 One
4 None
Explanation:
Three If all the three sides of the triangle are equal to corresponding three sides of other triangle. Both the triangles will be congruent by SSS rule.