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Which set of transformations would prove ΔQRS ~ ΔUTS?

Reflect ΔUTS over y = 2, and dilate ΔU′T′S′ by a scale factor of 2 from point S.
Reflect ΔUTS over y = 2, and translate ΔU′T′S′ by the rule (x − 2, y + 0).
Translate ΔUTS by the rule (x + 0, y + 6), and reflect ΔU′T′S′ over y = 6.
Translate ΔUTS by the rule (x − 2, y + 0), and reflect ΔU′T′S′ over y = 2.

Which set of transformations would prove ΔQRS ΔUTS Reflect ΔUTS over y 2 and dilate ΔUTS by a scale factor of 2 from point S Reflect ΔUTS over y 2 and translate class=

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Answer:

A

Step-by-step explanation:

The set of transformations would prove ΔQRS ~ ΔUTS is A. Reflect ΔUTS over y = 2, and dilate ΔU′T′S′ by a scale factor of 2 from point S.

How does transformation of a function happens?

The transformation of a function may involve any change.

Usually, these can be shift horizontally (by transforming inputs) or vertically (by transforming output), stretching (multiplying outputs or inputs) etc.

Firstly, we need the general rotation method (x,y) to (-y,x)

So; U (-4,-2) becomes U’ (2,-4)

T(-2,0) becomes T’(0,-2)

S(-2,-2) becomes S’ (2,-2)

The set of transformations would prove ΔQRS ~ ΔUTS are;

Reflect ΔUTS over y = 2, and dilate ΔU′T′S′ by a scale factor of 2 from point S.

Thus, option A is correct.

Learn more about transforming functions here:

https://brainly.com/question/17006186

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