296036
In the quadrilateral ABCD, AC = AD and AB bisect \(\angle\text{A}\) and \(\triangle\text{ABC}\cong\triangle\text{ABD}\)The relation between BC and BD is.
1 BC < BD
2 BC > BD
3 BC = BD
4 None of these
Explanation:
BC = BD In \(\triangle\text{ABC }\)and \(\triangle\text{ABD}\) AC = AD \(\angle\text{CAB}=\angle\text{DAB}\) AB = AB So, by SAS congruence rule, \(\triangle\text{ABC}\cong\triangle\text{ABD}\) BC = BD........ [By CPCT]
CONGRUENCE OF TRIANGLES
296037
To show that \(\triangle\text{ART}=\triangle\text{PEN}\) and we have to use SSS criterion. We have AR = PE and RT = EN. What more we need to show?
1 AT = PN
2 AT = PE
3 AT = EN
4 None of these
Explanation:
AT = PN
CONGRUENCE OF TRIANGLES
296038
In the given figure, lengths of the sides of the triangles are given. Which pair of triangle are congruent?
1 \(\triangle\text{ABC}=\triangle\text{PQR}\)
2 \(\triangle\text{BCA}=\triangle\text{PQR}\)
3 \(\triangle\text{ABC}=\triangle\text{QRP}\)
4 \(\text{None of these}\)
Explanation:
\(\triangle\text{ABC}=\triangle\text{PQR}\) By SSS congruency rule
CONGRUENCE OF TRIANGLES
296039
What is the side included between the angles M and N of \(\triangle\text{MNP}?\)
1 MN
2 NP
3 MP
4 None of these
Explanation:
MN
CONGRUENCE OF TRIANGLES
296040
In the given figure, say congruency of two triangles.
1 \(\triangle\text{AOC}\cup \triangle\text{BOD}\)
2 \(\triangle\text{AOC}\neq \triangle\text{BOD}\)
3 \(\triangle\text{AOC}\cup \triangle\text{OBD}\)
4 \(\text{None of these}\)
Explanation:
\(\triangle\text{AOC}\cup \triangle\text{BOD}\) \(\triangle\text{AOC}= \triangle\text{BOD}=30^\circ\) Vertically opposite angles. according to ASA congruency two triangles are congruent.
296036
In the quadrilateral ABCD, AC = AD and AB bisect \(\angle\text{A}\) and \(\triangle\text{ABC}\cong\triangle\text{ABD}\)The relation between BC and BD is.
1 BC < BD
2 BC > BD
3 BC = BD
4 None of these
Explanation:
BC = BD In \(\triangle\text{ABC }\)and \(\triangle\text{ABD}\) AC = AD \(\angle\text{CAB}=\angle\text{DAB}\) AB = AB So, by SAS congruence rule, \(\triangle\text{ABC}\cong\triangle\text{ABD}\) BC = BD........ [By CPCT]
CONGRUENCE OF TRIANGLES
296037
To show that \(\triangle\text{ART}=\triangle\text{PEN}\) and we have to use SSS criterion. We have AR = PE and RT = EN. What more we need to show?
1 AT = PN
2 AT = PE
3 AT = EN
4 None of these
Explanation:
AT = PN
CONGRUENCE OF TRIANGLES
296038
In the given figure, lengths of the sides of the triangles are given. Which pair of triangle are congruent?
1 \(\triangle\text{ABC}=\triangle\text{PQR}\)
2 \(\triangle\text{BCA}=\triangle\text{PQR}\)
3 \(\triangle\text{ABC}=\triangle\text{QRP}\)
4 \(\text{None of these}\)
Explanation:
\(\triangle\text{ABC}=\triangle\text{PQR}\) By SSS congruency rule
CONGRUENCE OF TRIANGLES
296039
What is the side included between the angles M and N of \(\triangle\text{MNP}?\)
1 MN
2 NP
3 MP
4 None of these
Explanation:
MN
CONGRUENCE OF TRIANGLES
296040
In the given figure, say congruency of two triangles.
1 \(\triangle\text{AOC}\cup \triangle\text{BOD}\)
2 \(\triangle\text{AOC}\neq \triangle\text{BOD}\)
3 \(\triangle\text{AOC}\cup \triangle\text{OBD}\)
4 \(\text{None of these}\)
Explanation:
\(\triangle\text{AOC}\cup \triangle\text{BOD}\) \(\triangle\text{AOC}= \triangle\text{BOD}=30^\circ\) Vertically opposite angles. according to ASA congruency two triangles are congruent.
296036
In the quadrilateral ABCD, AC = AD and AB bisect \(\angle\text{A}\) and \(\triangle\text{ABC}\cong\triangle\text{ABD}\)The relation between BC and BD is.
1 BC < BD
2 BC > BD
3 BC = BD
4 None of these
Explanation:
BC = BD In \(\triangle\text{ABC }\)and \(\triangle\text{ABD}\) AC = AD \(\angle\text{CAB}=\angle\text{DAB}\) AB = AB So, by SAS congruence rule, \(\triangle\text{ABC}\cong\triangle\text{ABD}\) BC = BD........ [By CPCT]
CONGRUENCE OF TRIANGLES
296037
To show that \(\triangle\text{ART}=\triangle\text{PEN}\) and we have to use SSS criterion. We have AR = PE and RT = EN. What more we need to show?
1 AT = PN
2 AT = PE
3 AT = EN
4 None of these
Explanation:
AT = PN
CONGRUENCE OF TRIANGLES
296038
In the given figure, lengths of the sides of the triangles are given. Which pair of triangle are congruent?
1 \(\triangle\text{ABC}=\triangle\text{PQR}\)
2 \(\triangle\text{BCA}=\triangle\text{PQR}\)
3 \(\triangle\text{ABC}=\triangle\text{QRP}\)
4 \(\text{None of these}\)
Explanation:
\(\triangle\text{ABC}=\triangle\text{PQR}\) By SSS congruency rule
CONGRUENCE OF TRIANGLES
296039
What is the side included between the angles M and N of \(\triangle\text{MNP}?\)
1 MN
2 NP
3 MP
4 None of these
Explanation:
MN
CONGRUENCE OF TRIANGLES
296040
In the given figure, say congruency of two triangles.
1 \(\triangle\text{AOC}\cup \triangle\text{BOD}\)
2 \(\triangle\text{AOC}\neq \triangle\text{BOD}\)
3 \(\triangle\text{AOC}\cup \triangle\text{OBD}\)
4 \(\text{None of these}\)
Explanation:
\(\triangle\text{AOC}\cup \triangle\text{BOD}\) \(\triangle\text{AOC}= \triangle\text{BOD}=30^\circ\) Vertically opposite angles. according to ASA congruency two triangles are congruent.
296036
In the quadrilateral ABCD, AC = AD and AB bisect \(\angle\text{A}\) and \(\triangle\text{ABC}\cong\triangle\text{ABD}\)The relation between BC and BD is.
1 BC < BD
2 BC > BD
3 BC = BD
4 None of these
Explanation:
BC = BD In \(\triangle\text{ABC }\)and \(\triangle\text{ABD}\) AC = AD \(\angle\text{CAB}=\angle\text{DAB}\) AB = AB So, by SAS congruence rule, \(\triangle\text{ABC}\cong\triangle\text{ABD}\) BC = BD........ [By CPCT]
CONGRUENCE OF TRIANGLES
296037
To show that \(\triangle\text{ART}=\triangle\text{PEN}\) and we have to use SSS criterion. We have AR = PE and RT = EN. What more we need to show?
1 AT = PN
2 AT = PE
3 AT = EN
4 None of these
Explanation:
AT = PN
CONGRUENCE OF TRIANGLES
296038
In the given figure, lengths of the sides of the triangles are given. Which pair of triangle are congruent?
1 \(\triangle\text{ABC}=\triangle\text{PQR}\)
2 \(\triangle\text{BCA}=\triangle\text{PQR}\)
3 \(\triangle\text{ABC}=\triangle\text{QRP}\)
4 \(\text{None of these}\)
Explanation:
\(\triangle\text{ABC}=\triangle\text{PQR}\) By SSS congruency rule
CONGRUENCE OF TRIANGLES
296039
What is the side included between the angles M and N of \(\triangle\text{MNP}?\)
1 MN
2 NP
3 MP
4 None of these
Explanation:
MN
CONGRUENCE OF TRIANGLES
296040
In the given figure, say congruency of two triangles.
1 \(\triangle\text{AOC}\cup \triangle\text{BOD}\)
2 \(\triangle\text{AOC}\neq \triangle\text{BOD}\)
3 \(\triangle\text{AOC}\cup \triangle\text{OBD}\)
4 \(\text{None of these}\)
Explanation:
\(\triangle\text{AOC}\cup \triangle\text{BOD}\) \(\triangle\text{AOC}= \triangle\text{BOD}=30^\circ\) Vertically opposite angles. according to ASA congruency two triangles are congruent.
296036
In the quadrilateral ABCD, AC = AD and AB bisect \(\angle\text{A}\) and \(\triangle\text{ABC}\cong\triangle\text{ABD}\)The relation between BC and BD is.
1 BC < BD
2 BC > BD
3 BC = BD
4 None of these
Explanation:
BC = BD In \(\triangle\text{ABC }\)and \(\triangle\text{ABD}\) AC = AD \(\angle\text{CAB}=\angle\text{DAB}\) AB = AB So, by SAS congruence rule, \(\triangle\text{ABC}\cong\triangle\text{ABD}\) BC = BD........ [By CPCT]
CONGRUENCE OF TRIANGLES
296037
To show that \(\triangle\text{ART}=\triangle\text{PEN}\) and we have to use SSS criterion. We have AR = PE and RT = EN. What more we need to show?
1 AT = PN
2 AT = PE
3 AT = EN
4 None of these
Explanation:
AT = PN
CONGRUENCE OF TRIANGLES
296038
In the given figure, lengths of the sides of the triangles are given. Which pair of triangle are congruent?
1 \(\triangle\text{ABC}=\triangle\text{PQR}\)
2 \(\triangle\text{BCA}=\triangle\text{PQR}\)
3 \(\triangle\text{ABC}=\triangle\text{QRP}\)
4 \(\text{None of these}\)
Explanation:
\(\triangle\text{ABC}=\triangle\text{PQR}\) By SSS congruency rule
CONGRUENCE OF TRIANGLES
296039
What is the side included between the angles M and N of \(\triangle\text{MNP}?\)
1 MN
2 NP
3 MP
4 None of these
Explanation:
MN
CONGRUENCE OF TRIANGLES
296040
In the given figure, say congruency of two triangles.
1 \(\triangle\text{AOC}\cup \triangle\text{BOD}\)
2 \(\triangle\text{AOC}\neq \triangle\text{BOD}\)
3 \(\triangle\text{AOC}\cup \triangle\text{OBD}\)
4 \(\text{None of these}\)
Explanation:
\(\triangle\text{AOC}\cup \triangle\text{BOD}\) \(\triangle\text{AOC}= \triangle\text{BOD}=30^\circ\) Vertically opposite angles. according to ASA congruency two triangles are congruent.
