The rule (x,3/4y) is applied to a polygon. The given point is on the original polygon. Find the image of the point (6,8)

6,6

To find the image of the point (6, 8) using the rule (x, 3/4y), we need to apply this rule to the given point.

Let's substitute the values of (x, y) = (6, 8) into the rule:

Image of x-coordinate = x = 6
Image of y-coordinate = 3/4 * y = 3/4 * 8 = 6

Therefore, the image of the point (6, 8) is (6, 6).

To find the image of the point (6, 8) after applying the rule (x, 3/4y), we need to apply the rule to each coordinate separately.

Let's apply the rule to the x-coordinate of the point (6, 8):
x → x
So, the x-coordinate of the image of the point (6, 8) remains the same.

Next, let's apply the rule to the y-coordinate of the point (6, 8):
y → (3/4)y
Since y = 8, we can substitute it into the rule:
y → (3/4)(8)
y → 6

Therefore, the image of the point (6, 8) after applying the rule (x, 3/4y) is (6, 6).