9th-Grade-Math---USA

Properties-of-Transformations

Easy

Question

The quadrilateral is rotated about P. The value of y is

$\frac{8}{5}$
2
3
4

The correct answer is: 2

The point R(3, 1) is rotated 270^o about the origin in counter clockwise direction. The new co-ordinates relative to original one is

9th-Grade-Math---USAProperties-of-Transformations

Properties-of-Transformations

9th-Grade-Math---USA

$open square brackets table row 5 cell negative 3 end cell row 6 cell negative 6 end cell end table close square brackets plus open square brackets table row 1 2 row 3 cell negative 4 end cell end table close square brackets equals$

9th-Grade-Math---USAProperties-of-Transformations

Properties-of-Transformations

9th-Grade-Math---USA

Translate Q(0, -8) using (x, y) $rightwards arrow$ (x – 3, y + 2)

9th-Grade-Math---USAProperties-of-Transformations

Properties-of-Transformations

9th-Grade-Math---USA

Use the translation (x, y) $rightwards arrow$ (x - 8, y + 4). The image of (2, 6) is

9th-Grade-Math---USAProperties-of-Transformations

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 quadrilateral is rotated about P. The value of y is

234

The correct answer is: 2

Related Questions to study

The point R(3, 1) is rotated 270o about the origin in counter clockwise direction. The new co-ordinates relative to original one is

The point R(3, 1) is rotated 270o about the origin in counter clockwise direction. The new co-ordinates relative to original one is

The line of reflection for and its image is __________

The line of reflection for and its image is __________

Translate P(6, 3) using (x, y)(x + 3, y – 2)

Translate P(6, 3) using (x, y)(x + 3, y – 2)

Identify the product not defined.

Identify the product not defined.

Translate Q(0, -8) using (x, y)(x – 3, y + 2)

Translate Q(0, -8) using (x, y)(x – 3, y + 2)

Use the translation (x, y)(x - 8, y + 4). The image of (2, 6) is

Use the translation (x, y)(x - 8, y + 4). The image of (2, 6) is

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

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

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

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

List the sides in order from smallest to largest.

List the sides in order from smallest to largest.

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

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

The length of is

The length of is

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

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

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

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

In the diagram, if is the perpendicular bisector of , then the value of MN is

In the diagram, if is the perpendicular bisector of , then the value of MN is

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$\frac{8}{5}$
2
3
4

The point R(3, 1) is rotated 270^o about the origin in counter clockwise direction. The new co-ordinates relative to original one is

The point R(3, 1) is rotated 270^o about the origin in counter clockwise direction. The new co-ordinates relative to original one is

The line of reflection for $increment A B C$ and its image is __________

The line of reflection for $increment A B C$ and its image is __________

Translate P(6, 3) using (x, y) $rightwards arrow$ (x + 3, y – 2)

Translate P(6, 3) using (x, y) $rightwards arrow$ (x + 3, y – 2)

Translate Q(0, -8) using (x, y) $rightwards arrow$ (x – 3, y + 2)

Translate Q(0, -8) using (x, y) $rightwards arrow$ (x – 3, y + 2)

Use the translation (x, y) $rightwards arrow$ (x - 8, y + 4). The image of (2, 6) is

Use the translation (x, y) $rightwards arrow$ (x - 8, y + 4). The image of (2, 6) 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 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