Question

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Answer 1

1)

Given the triangle RST with Coordinates R(2,1), S(2, -2) and T(-1 , -2).

A dilation is a transformation which produces an image that is the same shape as original one, but is different size.

Since, the scale factor
`(5)/(3)` is greater than 1, the image is enlargement or a stretch.

Now, draw the dilation image of the triangle RST with center (2,-2) and scale factor
`(5)/(3)`

Since, the center of dilation at S(2,-2) is not at the origin, so the point S and its image
`S{}'` are same.

Now, the distances from the center of the dilation at point S to the other points R and T.

The dilation image will be
`(5)/(3)` of each of these distances,

`SR=3`, so
`S{}'R{}'`=5 ;

`ST=3`, so
`S{}'T{}'=5`

Now, draw the image of RST i.e R'S'T'

Since,
`RT=3√(2)` [By using hypotenuse of right angle triangle] and
`R{}'T{}'=5√(2)`.

2)

(a)

Disagree with the given statement.

Side Angle Side postulate (SAS) states that:

If two sides and the included angle of one triangle are congruent to two sides and the included angle of another triangle then these two triangles are congruent.

Given: B is the midpoint of
`\overline{AC}` i.e
`\overline{AB}\cong \overline{BC}`

In the triangle ABD and triangle CBD, we have

`\overline{AB}\cong \overline{BC}` (SIDE) [Given]

`\overline{BD}\cong \overline{BD}` (SIDE) [Reflexive post]

Since, there is no included angle in these triangles.

∴
`\Delta ABD` is not congruent to
`\Delta CBD` .

Therefore, these triangles does not follow the SAS congruence postulates.

(b)

SSS(SIDE-SIDE-SIDE) states that if three sides of one triangle are congruent to three sides of another triangle, then the triangles are congruent.

Since it is also given that
`\overline{AD}\cong \overline{CD}`.

therefore, in the triangle ABD and triangle CBD, we have

`\overline{AB}\cong \overline{BC}` (SIDE) [Given]

`\overline{AD}\cong \overline{CD}` (SIDE) [Given]

`\overline{BD}\cong \overline{BD}` (SIDE) [Reflexive post]

therefore by, SSS postulates
`\Delta ABD\cong \Delta CBD`.

3)

Given that:
`\angle1=\angle 3` are vertical angles, as they are formed by intersecting lines.

Therefore

, by the definition of linear pairs

`\angle 1` and
`\angle 2` and
`\angle 3` and
`\angle 2` are linear pair.

By linear pair theorem,
`\angle 1` and
`\angle 2` are supplementary,
`\angle 2` and
`\angle 3` are supplementary.

`m\angle1+m\angle 2=180^(\circ)`

`m\angle2+m\angle 3=180^(\circ)`

Equate the above expressions:

`m\angle 1+m\angle 2=m\angle 2+m\angle 3`

Subtract the angle 2 from both sides in the above expressions

∴
`m\angle 1=m\angle 3`

By Congruent Supplement theorem: If two angles are supplements of the same angle, then the two angles are congruent.

therefore,
`\angle 1\cong \angle 3`.