Each of two sides of a triangular banner measures 24 in. If the perimeter of the banner is 62 in., what is the length of the third side of the banner?

Question

Visualize a simplified yet appealing image of a triangular banner. The triangle has two sides highlighted that are equal in length, representing the measurements of 24 inches each. The third side, the variable one, is represented with a question mark or a blank space, hinting it's the value to be determined. Provide a minimalist backdrop to this geometric image. Please ensure that the image contains no text.

Each of two sides of a triangular banner measures 24 in. If the perimeter of the banner is 62 in., what is the length of the third side of the banner?

Answer 1

(2 * 24) + x = 62

x = 62 - 48

x = ?

Answer 2

To find the length of the third side of the triangular banner, we need to subtract the sum of the lengths of the two known sides from the perimeter of the banner.

The first known side measures 24 in.

The second known side also measures 24 in.

Adding the lengths of the two known sides, we get: 24 + 24 = 48 in.

To find the length of the third side, we subtract this sum from the perimeter of the banner.

Perimeter of the banner = 62 in.

Length of the third side = Perimeter - Sum of known side lengths
Length of the third side = 62 - 48

Calculating, the length of the third side of the banner is 14 in.

Answer 3

To find out the length of the third side of the triangular banner, we need to know the sum of the lengths of all three sides. Given that each of the two sides measures 24 inches, which means both sides combined would be 24 + 24 = 48 inches.

Now, to find the length of the third side, we can subtract the sum of the first two sides from the perimeter of the banner, which is 62 inches.

Third side length = Perimeter - Sum of first two sides

Third side length = 62 - 48

Third side length = 14 inches

Therefore, the length of the third side of the triangular banner is 14 inches.