Respuesta :
Answer:
It is given that Rectangle Q has an area of 2 square units.
Thea Drew a scaled version of Rectangle Q and marked it as R.
As you must keep in mind If we draw scaled copy of pre-image, then the two images i.e Pre-image and Image are similar.
As you have not written what is the scale factor of transformation
Suppose , Let the Scale factor of transformation= k
Rectangle Q = Pre -image, Rectangle R= Image
If, Pre-Image < Image , then scale factor is k >1.
But If, Pre-Image > Image , then Scale factor will be i.e lies between, 0<k<1.
Answer:
6
Step-by-step explanation:
The area of a polygon created with a scale factor of xxx is x^2x
2
x, start superscript, 2, end superscript times larger than the original polygon:
\text{scale factor}^2=\text{how many times larger area of scale copy is}scale factor
2
=how many times larger area of scale copy iss, c, a, l, e, space, f, a, c, t, o, r, start superscript, 2, end superscript, equals, h, o, w, space, m, a, n, y, space, t, i, m, e, s, space, l, a, r, g, e, r, space, a, r, e, a, space, o, f, space, s, c, a, l, e, space, c, o, p, y, space, i, s
The area of Rectangle RRR is 363636 times greater than the area of Rectangle QQQ. Let's substitute 363636 into the equation to find the scale factor.
?^2=36?
2
=36question mark, start superscript, 2, end superscript, equals, 36
The scale factor is 666.
Hint #33 / 3
Thea used a scale factor of 666 to go from Rectangle QQQ to Rectangle RRR.
