suppose you used the rule (3x+1,3y-4) to transform the original figure into a new figure. Would the new figure be similar to the original? Explain. I NEED HELP ASAP PLEASE!!! HELP. Thanks.

If you apply that transform rule to every (x,y) point in the figure, the new figure will be similar but displaced.

Question. Suppose the class has $80. to spend on T shirts describe how you can use a table and a graph to find the number of T shirts you can buy. Sophia write the following equation in her notebook: C=2(15)+20. What is she looking for?

Sophia,you can use a table to see how many shirts are needed and to figure out the size. You can use a graph to see how much each one costs and to figure out the total

what is 7 pounds is =

If a rule is (3x,y) and a sce factor of 4 is used to transform it , what will tge new rule be ?

To determine if the new figure created by the transformation is similar to the original figure, we need to check if the ratio of the corresponding sides remains the same.

In this case, the rule given is (3x + 1, 3y - 4), which means the x-coordinate of each point in the original figure is multiplied by 3 and then increased by 1, and the y-coordinate is multiplied by 3 and then decreased by 4.

Let's say one side of the original figure has length AB. After applying the transformation, the coordinates A' and B' of the corresponding points in the new figure are (3x_A + 1, 3y_A - 4) and (3x_B + 1, 3y_B - 4), respectively.

The length of the corresponding side in the new figure is given by the distance formula:

Distance = sqrt((3x_B + 1 - 3x_A - 1)^2 + (3y_B - 4 - 3y_A + 4)^2)
= sqrt((3x_B - 3x_A)^2 + (3y_B - 3y_A)^2)
= sqrt(9(x_B - x_A)^2 + 9(y_B - y_A)^2)
= 3 * sqrt((x_B - x_A)^2 + (y_B - y_A)^2)
= 3 * Length of AB

We can see that the length of the corresponding side in the new figure is three times the length of the side AB in the original figure. Since the ratio of the corresponding sides is constant (in this case, 3), we can conclude that the new figure is similar to the original figure.