Find the surface area of the prism write your answer as a mixed number in simplest form

Question

asked Oct 26, 2023 233k views

1 Answer

Artem · Answer 1 · 2023-11-02T04:06:44+0000

The surface area refers to the area of all the faces of the prism.

Notice that there are two equal triangular faces and three different rectangular faces.

The triangular areas would be defined by

$A_(triangular)=2(6(1)/(4)\cdot15\cdot(1)/(2))$

Since the area of each triangle is the semi-product between the base and the height of the triangle.

We have to transform the mixed number into a fraction.

$A_(triangular)=2((25)/(4)\cdot15\cdot(1)/(2))=(375)/(4)$

Let's find each different rectangular area.

$A_(bottom)=12\cdot16(1)/(4)=12\cdot(65)/(4)=195$
$A_(right)=12\cdot6(1)/(4)=12\cdot(25)/(4)=75$
$A_(left)=12\cdot15=180$

At last, we sum all the areas to find the total surface area.