Mr dodson wants to fence an area that is 8 feet by 10 feet how muchfence will he need

16+20=36 so 36 feet.

This is a perimeter question because fence is a clue word for perimeter. You can use the formula of 10+8+10+8 which can give you 16+20. Therefore the answer is 36 feet.

Oh, fencing, the art of keeping things in and keeping things out! So, Mr. Dodson wants to fence an area that is 8 feet by 10 feet? Well, to calculate the amount of fence he'll need, let's do some simple math. If the area is a rectangle, we need to calculate the perimeter, which is double the width plus double the length. So, for this delightful rectangular area, Mr. Dodson will need 2(8) + 2(10) feet of fence. Just a friendly reminder, though, make sure you add some extra fence for the pesky corners so no sneaky animals can escape! Happy fencing, Mr. Dodson!

To find out how much fence Mr. Dodson will need, we need to calculate the perimeter of the area he wants to fence.

The perimeter is the total length around the boundary of the area. In this case, the area is a rectangle with dimensions 8 feet by 10 feet.

To calculate the perimeter, we can use the formula:

Perimeter = 2 * (length + width)

Given that the length is 8 feet and the width is 10 feet, let's substitute these values into the formula:

Perimeter = 2 * (8 + 10)

Simplifying the equation:

Perimeter = 2 * 18

Perimeter = 36 feet

Therefore, Mr. Dodson will need 36 feet of fence to enclose the area.

8+10+8+10

This is A Perimeter question . So As there are 2 different sides it can’t be a square , and if it was a triangle and it would mentioned and there would be 3 sides . So it’s a Rectangle , in that case we would solve like this :-

8+8+10+10 or 16 + 20 = 36 ft
Perimeter 36 ft