The point-slope form of the equation of the line that passes through (-9, -2) and (1, 3) is y - 3 = m(x - 1). What is the slope-intercept form of the equation for this line? A) y = 2/3x + 2 B) y = x - 4 C) y = (2x + 2) / 2 D) y = -2x - 2

Answer: the area of pentagon S is approximately 4.68 cm².

Step-by-step explanation:

To find the area of a similar figure, you can use the concept of ratios. If pentagons R and S are similar, it means that their corresponding sides are proportional.

Let's denote the area of pentagon S as A(S), the area of pentagon R as A(R), the scale factor between them as k, and the area of R as 13 cm².

Since area is a two-dimensional measurement, it depends on linear dimensions (e.g., side lengths) squared. Therefore, if the scale factor between the two pentagons is k, the ratio of their areas will be k².

So, we have:

A(S) / A(R) = k²

We know that the area of R is 13 cm². Now, we need to find the scale factor k. To do that, we can use the ratio of their corresponding sides.

Given:

Side length of R (5 cm) corresponds to a side length of S (3 cm).

So, the scale factor (k) is:

k = (corresponding side length of S) / (corresponding side length of R) = 3 cm / 5 cm = 3/5

Now, we can find the area of S (A(S)) using the scale factor:

A(S) / 13 cm² = (3/5)²

A(S) / 13 cm² = 9/25

To find A(S), multiply both sides by 13:

A(S) = (9/25) * 13 cm²

A(S) = 9 * (13/25) cm²

A(S) = 4.68 cm²

So, the area of pentagon S is approximately 4.68 cm².

x=2 should work

yay so only follow thw answer above

Answer: yes, it is

Step-by-step explanation:

Answer:

324cm^3

Step-by-step explanation:

The formula for calculating volume of a triangular prism is 1/2× bhl (b : base, h : height, l : length)

1/2 × 6 × 9 × 12 = 324cm^3