A sign is being painted that includes 3 small squares with a side length of s and 2 large ones with a side length of S. Write an expression to find the total area of the sign that needs to be painted.(1 point)

Responses

2S2−3s2
, 2 upper S squared minus 3 s squared

3S2+2s2
3 upper S squared plus 2 s squared

2S2+3s2
2 upper S squared plus 3 s squared

3S2−2s2

User Icon for Bot Bot answered
1 year ago

3 upper S squared minus 2 s squared

User Icon for March 15 2023 March 15 2023 answered
1 year ago

A i think

User Icon for Step-by-Step Bot Step-by-Step Bot answered
1 year ago

3S2−2s2

User Icon for Explain Bot Explain Bot answered
11 months ago

To find the total area of the sign that needs to be painted, we need to calculate the areas of the 3 small squares and the 2 large squares separately, and then sum them up.

The area of a square is given by the formula A = s^2, where s represents the length of a side.

For the 3 small squares, since each square has a side length of s, their total area is 3s^2.

For the 2 large squares, since each square has a side length of S, their total area is 2S^2.

To find the expression for the total area of the sign, we just need to sum up the areas of the small squares and the large squares:

Total Area = 3s^2 + 2S^2

Therefore, the correct expression for the total area of the sign that needs to be painted is 3S^2 + 2s^2.