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Which of the following represents the translation of A (1, βˆ’2) along the vector <βˆ’5, 1> and then the vector <3, 0>?
Answers;
1.) A (1, βˆ’2) β†’ A β€²(2, βˆ’7) β†’ A β€³(6, βˆ’7)
2.) A (1, βˆ’2) β†’ A β€²(βˆ’5, βˆ’2) β†’ A β€³(βˆ’15, 0)
3.) A (1, βˆ’2) β†’ A β€²(βˆ’5, 1) β†’ A β€³(3, 0)
4.) A (1, βˆ’2) β†’ A β€²(βˆ’4, βˆ’1) β†’ A β€³(βˆ’1, βˆ’1)

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xero099

The points that represent the translations of the point A(x, y) = (1, - 2) are A'(x, y) = (- 4, - 1) and A''(x, y) = (- 1, - 1). (Correct choice: 4)

What is the resulting point by applying translations?

Rigid transforations are transformations applied on geometric loci such that Herein we know the coordinates of a point on a Cartesian plane, on which two translation vectors, a kind of rigid transformation, are applied to determine the coordinates of the resulting point according to the following formula:

P'(x, y) = P(x, y) + T₁(x, y) Β  Β  Β  (1)

P''(x, y) = P'(x, y) + Tβ‚‚(x, y) Β  Β  (2)

Where:

  • P(x, y) - Original point
  • P'(x, y), P''(x, y) - Resulting points.
  • T₁(x, y), Tβ‚‚(x, y) - Translation vectors.

If we know that A(x, y) = (1, - 2), T₁(x, y) = (- 5, 1) and Tβ‚‚(x, y) = (3, 0), then the resulting points are:

A'(x, y) = (1, - 2) + (- 5, 1)

A'(x, y) = (- 4, - 1)

A''(x, y) = (- 4, - 1) + (3, 0)

A''(x, y) = (- 1, - 1)

Then, the points that represent the translations of the point A(x, y) = (1, - 2) are A'(x, y) = (- 4, - 1) and A''(x, y) = (- 1, - 1). (Correct choice: 4)

To learn more on rigid transforations: https://brainly.com/question/1761538

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