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. Thank you so much.

(P.S, I need help ASAP D:)

so, check the links below. One of them has the response you need

To determine if the new figure is similar to the original figure when using the given rule (3x+1, 3y-4), we need to compare the corresponding sides of the two figures.

In a coordinate plane, a transformation rule like (3x+1, 3y-4) indicates that each point (x, y) in the original figure is mapped to a new point (3x+1, 3y-4) in the new figure.

To check if the new figure is similar to the original, we compare the ratios of corresponding side lengths.

Let's say we have a line segment AB in the original figure, and its corresponding line segment in the new figure is A'B'. The length of AB is represented as AB, and the length of A'B' is represented as A'B'.

If we calculate the ratio of the lengths of these two line segments, it should be equal to the same ratio for each pair of corresponding sides in the figures, if they are similar.

In this case, we calculate the ratio of corresponding side lengths using the formula:

AB' / AB = (A'B' - A'B) / (AB - AB')

If the ratio of corresponding side lengths is constant for all pairs of corresponding sides, then the new figure would be similar to the original figure.

So, to determine if the new figure is similar to the original using the transformation rule (3x+1, 3y-4), you would need to compare the ratios of corresponding side lengths as explained above.

Please note that since you haven't provided any additional information about the figure, it's not possible to give a definitive answer. You may need to apply the given transformation rule to specific points or line segments in your figure to determine if the new figure is similar to the original.