So remember that the area of a trapezoid is [tex] A=\frac{b_1+b_2}{2}h [/tex] , with b = bases and h = height. Before we can do the equation, however, we have to find the height. Using the right triangle, we can use the pythagorean theorem, which is [tex] leg^2+leg^2=hypotenuse^2 [/tex] .
Since we know that the hypotenuse is 13 and one of the legs is 12, we can solve for the other leg. Our equation will look like this: [tex] x^2+12^2=13^2 [/tex]
Firstly, solve the exponents: [tex] x^2+144=169 [/tex]
Next, subtract 144 on both sides: [tex] x^2=25 [/tex]
Next, square root both sides, and your height will be: x = 5
Now that we know both the height, 5, and the bases, 30 and 40, we can solve for the area of the trapezoid. Our equation will look like this: [tex] A=\frac{30+40}{2}*5 [/tex]
Firstly, combine everything on the numerator: [tex] A=\frac{70}{2}*5 [/tex]
Next, divide the fraction: [tex] A=35*5 [/tex]
Next, multiply, and your answer will be A = 175 un^2.
