![]() Also, the other side of one of the pairs is equal to the first base edge, say l, and the other is equal to the length of the second one, which is w. All of those have one side equal to h, the lateral edge (or the height) of the prism. What is more, among the four, there are two pairs of identical ones (the front and back wall and the left and right wall). We have four faces contributing to that number, and all of them are rectangles. Piece of cake, wasn't it? Well, let's now try to do something a little bit more complicated and move on to the lateral area. And that is precisely the formula for the base area: With our notation, it is a rectangle with sides l and w, so its area is l × w. Now, let's use that information to study the base of our prism. Recall that all the faces in our calculator are rectangles, and, as mentioned in the rectangle area calculator, they are calculated by multiplying the side lengths. Surface_area = 2 × base_area + lateral_area, Therefore, since the solid has two bases (the bottom one and the top one), the surface area of a rectangular prism formula is as follows: On the other hand, A_l denotes the lateral area, meaning the total area of the four lateral faces. Note that A_b denotes the surface area of a single base of our prism.
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