Answer:
Explanation:
So this prism has the triangles faces at the base and top, but the sides are all rectangles, let me know if you can't quite picture that.
Anyway, the surface area will be the sum of all the faces. There are five total, and two of them are the same. The base ad top are the exact same right triangle, so we'll take care of those. each of those faces has an area of .5*4*3 = 6. And since there are two we knw they contribute 12 together. This means that total surface area number 126 has 12 from the base face and the top face, so we can subtract that.
126-12=114
So now we know the three side faces all add up to 114 in^2 for their area. or in other words F1 + F2 + F3 = 114. SO face one plus face two plus face three. Now how do we find the area of the faces?
The side faces have the same height to them, which is the height of the prism, which is what we're looking for. We also know the base length of each of the prisms. Basically each one has a base length of one of the sides of the triangle at the base and top. And how do we find the area of a rectangle? b *h. So fow the Fs become b1*h b2*h and b3 times height, but we know what the bases are.
F1 + F2 + F3 = 114
b1 * h + b2 * h + b3 * h = 114
3h + 4h + 5h = 114
Now we just combine like terms and it's a simple algebraic equation.
12h = 114
h = 9.5
Again, let me know if there's something you don't understand.