Solution for the question - the postulate we use to prove /_\abc~=/_\h int k is not enough informationsas aas asa

9th-Grade-Math---USA

Congruent-Triangles

Easy

Question

The postulate we use to prove $increment A B C approximately equal to capital delta H J K$ is

ASA
AAS
SAS
Not enough information

The correct answer is: AAS

If x^o, 3x^o & 60^o are the interior angles of $capital delta$ ABC, then classify the triangle.

9th-Grade-Math---USACongruent-Triangles

Congruent-Triangles

9th-Grade-Math---USA

The greatest interior angle of $capital delta ABC comma text if end text m angle A equals x degree comma m angle B equals 2 x degree & m angle C equals 3 x degree.$

9th-Grade-Math---USACongruent-Triangles

Relation-within-Triangles

9th-Grade-Math---USA

If WZ is the perpendicular bisector of XY, then the value of XZ is

9th-Grade-Math---USARelation-within-Triangles

Relation-within-Triangles

9th-Grade-Math---USA

The co-ordinates of the centroid D of $increment R S T$ having vertices as R(-6, 2), S(-2, 6), T(2, 4) is

9th-Grade-Math---USARelation-within-Triangles

Relation-within-Triangles

9th-Grade-Math---USA

List the sides in order from smallest to largest.

9th-Grade-Math---USARelation-within-Triangles

Relation-within-Triangles

9th-Grade-Math---USA

Centroid divides the median in the ratio (from the vertex)

9th-Grade-Math---USARelation-within-Triangles

Relation-within-Triangles

9th-Grade-Math---USA

The length of $stack A B with bar on top$ is

9th-Grade-Math---USARelation-within-Triangles

Relation-within-Triangles

9th-Grade-Math---USA

In the diagram, N is the incentre of $increment G H J$ .

The statement that cannot be deducted from the figure is

9th-Grade-Math---USARelation-within-Triangles

Relation-within-Triangles

9th-Grade-Math---USA

In the diagram, if M is the centroid of $increment A C T$ , CM = 36, then the value of MR is

9th-Grade-Math---USARelation-within-Triangles

Relation-within-Triangles

9th-Grade-Math---USA

In the diagram, if $stack L M with bar on top$ is the perpendicular bisector of $stack P N with bar on top$ , then the value of MN is

9th-Grade-Math---USARelation-within-Triangles

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The postulate we use to prove is

ASA AAS SAS Not enough information

The correct answer is: AAS

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List the sides in order from smallest to largest.

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In the diagram, N is the incentre of .The statement that cannot be deducted from the figure is

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In the diagram, if M is the centroid of , CM = 36, then the value of MR is

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The postulate we use to prove $increment A B C approximately equal to capital delta H J K$ is

ASA
AAS
SAS
Not enough information

If x^o, 3x^o & 60^o are the interior angles of $capital delta$ ABC, then classify the triangle.

If x^o, 3x^o & 60^o are the interior angles of $capital delta$ ABC, then classify the triangle.

The greatest interior angle of $capital delta ABC comma text if end text m angle A equals x degree comma m angle B equals 2 x degree & m angle C equals 3 x degree.$

The greatest interior angle of $capital delta ABC comma text if end text m angle A equals x degree comma m angle B equals 2 x degree & m angle C equals 3 x degree.$

The co-ordinates of the centroid D of $increment R S T$ having vertices as R(-6, 2), S(-2, 6), T(2, 4) is

The co-ordinates of the centroid D of $increment R S T$ having vertices as R(-6, 2), S(-2, 6), T(2, 4) is

The length of $stack A B with bar on top$ is

The length of $stack A B with bar on top$ is

In the diagram, N is the incentre of $increment G H J$ .

The statement that cannot be deducted from the figure is

In the diagram, N is the incentre of $increment G H J$ .

The statement that cannot be deducted from the figure is

In the diagram, if M is the centroid of $increment A C T$ , CM = 36, then the value of MR is

In the diagram, if M is the centroid of $increment A C T$ , CM = 36, then the value of MR is

In the diagram, if $stack L M with bar on top$ is the perpendicular bisector of $stack P N with bar on top$ , then the value of MN is

In the diagram, if $stack L M with bar on top$ is the perpendicular bisector of $stack P N with bar on top$ , then the value of MN is