296018
If two line segments have the same (equal) length, they are —————
1 Congruent
2 Similar
3 Opposite
Explanation:
Congruent
CONGRUENCE OF TRIANGLES
296019
How many altitudes can a triangle have?
1 1
2 2
3 3
4 4
Explanation:
3 The three altitudes of a triangle intersect at the orthocenter, which for an acute triangle is inside the triangle.
CONGRUENCE OF TRIANGLES
296020
For \(\triangle\text{ABC}\) and \(\triangle\text{DEF},\angle\text{B}=\angle\text{D},\angle\text{C}=\angle\text{F}\) and BC = DF. Therefore which of the following is correct?
1 \(\triangle\text{ABC}\cong\triangle\text{DEF}\)
2 \(\triangle\text{BCA}\cong\triangle\text{DFE}\)
3 \(\triangle\text{BCA}\cong\triangle\text{DEF}\)
4 \(\triangle\text{ABC}\cong\triangle\text{DFE}\)
Explanation:
\(\triangle\text{BCA}\cong\triangle\text{DFE}\) For \(\triangle\text{ABC}\) and \(\triangle\text{DEF}\) we have \(\angle\text{B}=\angle\text{D},\angle\text{C}=\angle\text{F}\) Given BC = DF.....Given Therefore, according to A.S.A condition for congruence, \(\triangle\text{BCA}\cong\triangle\text{DFE}\)
CONGRUENCE OF TRIANGLES
296021
If \(\triangle\text{ABC}\cong\triangle\text{PQR}\) then the value of \(\angle\text{A}\) is.
NEET Test Series from KOTA - 10 Papers In MS WORD
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CONGRUENCE OF TRIANGLES
296018
If two line segments have the same (equal) length, they are —————
1 Congruent
2 Similar
3 Opposite
Explanation:
Congruent
CONGRUENCE OF TRIANGLES
296019
How many altitudes can a triangle have?
1 1
2 2
3 3
4 4
Explanation:
3 The three altitudes of a triangle intersect at the orthocenter, which for an acute triangle is inside the triangle.
CONGRUENCE OF TRIANGLES
296020
For \(\triangle\text{ABC}\) and \(\triangle\text{DEF},\angle\text{B}=\angle\text{D},\angle\text{C}=\angle\text{F}\) and BC = DF. Therefore which of the following is correct?
1 \(\triangle\text{ABC}\cong\triangle\text{DEF}\)
2 \(\triangle\text{BCA}\cong\triangle\text{DFE}\)
3 \(\triangle\text{BCA}\cong\triangle\text{DEF}\)
4 \(\triangle\text{ABC}\cong\triangle\text{DFE}\)
Explanation:
\(\triangle\text{BCA}\cong\triangle\text{DFE}\) For \(\triangle\text{ABC}\) and \(\triangle\text{DEF}\) we have \(\angle\text{B}=\angle\text{D},\angle\text{C}=\angle\text{F}\) Given BC = DF.....Given Therefore, according to A.S.A condition for congruence, \(\triangle\text{BCA}\cong\triangle\text{DFE}\)
CONGRUENCE OF TRIANGLES
296021
If \(\triangle\text{ABC}\cong\triangle\text{PQR}\) then the value of \(\angle\text{A}\) is.
296018
If two line segments have the same (equal) length, they are —————
1 Congruent
2 Similar
3 Opposite
Explanation:
Congruent
CONGRUENCE OF TRIANGLES
296019
How many altitudes can a triangle have?
1 1
2 2
3 3
4 4
Explanation:
3 The three altitudes of a triangle intersect at the orthocenter, which for an acute triangle is inside the triangle.
CONGRUENCE OF TRIANGLES
296020
For \(\triangle\text{ABC}\) and \(\triangle\text{DEF},\angle\text{B}=\angle\text{D},\angle\text{C}=\angle\text{F}\) and BC = DF. Therefore which of the following is correct?
1 \(\triangle\text{ABC}\cong\triangle\text{DEF}\)
2 \(\triangle\text{BCA}\cong\triangle\text{DFE}\)
3 \(\triangle\text{BCA}\cong\triangle\text{DEF}\)
4 \(\triangle\text{ABC}\cong\triangle\text{DFE}\)
Explanation:
\(\triangle\text{BCA}\cong\triangle\text{DFE}\) For \(\triangle\text{ABC}\) and \(\triangle\text{DEF}\) we have \(\angle\text{B}=\angle\text{D},\angle\text{C}=\angle\text{F}\) Given BC = DF.....Given Therefore, according to A.S.A condition for congruence, \(\triangle\text{BCA}\cong\triangle\text{DFE}\)
CONGRUENCE OF TRIANGLES
296021
If \(\triangle\text{ABC}\cong\triangle\text{PQR}\) then the value of \(\angle\text{A}\) is.
296018
If two line segments have the same (equal) length, they are —————
1 Congruent
2 Similar
3 Opposite
Explanation:
Congruent
CONGRUENCE OF TRIANGLES
296019
How many altitudes can a triangle have?
1 1
2 2
3 3
4 4
Explanation:
3 The three altitudes of a triangle intersect at the orthocenter, which for an acute triangle is inside the triangle.
CONGRUENCE OF TRIANGLES
296020
For \(\triangle\text{ABC}\) and \(\triangle\text{DEF},\angle\text{B}=\angle\text{D},\angle\text{C}=\angle\text{F}\) and BC = DF. Therefore which of the following is correct?
1 \(\triangle\text{ABC}\cong\triangle\text{DEF}\)
2 \(\triangle\text{BCA}\cong\triangle\text{DFE}\)
3 \(\triangle\text{BCA}\cong\triangle\text{DEF}\)
4 \(\triangle\text{ABC}\cong\triangle\text{DFE}\)
Explanation:
\(\triangle\text{BCA}\cong\triangle\text{DFE}\) For \(\triangle\text{ABC}\) and \(\triangle\text{DEF}\) we have \(\angle\text{B}=\angle\text{D},\angle\text{C}=\angle\text{F}\) Given BC = DF.....Given Therefore, according to A.S.A condition for congruence, \(\triangle\text{BCA}\cong\triangle\text{DFE}\)
CONGRUENCE OF TRIANGLES
296021
If \(\triangle\text{ABC}\cong\triangle\text{PQR}\) then the value of \(\angle\text{A}\) is.
