And we use that information and the Pythagorean Theorem to solve for x. So this is x over two and this is x over two. Two congruent right triangles and so it also splits this base into two. So the key of realization here is isosceles triangle, the altitudes splits it into ![]() So this length right over here, that's going to be five and indeed, five squared plus 12 squared, that's 25 plus 144 is 169, 13 squared. This distance right here, the whole thing, the whole thing is So x is equal to the principle root of 100 which is equal to positive 10. But since we're dealing with distances, we know that we want the This purely mathematically and say, x could be Is equal to 25 times four is equal to 100. It always has one unequal side and angle. The base angles, which are opposite to the sides of equal length, are also two equal angles. An isosceles triangle is a type of triangle with two equal sides. We can multiply both sides by four to isolate the x squared. The area of an isosceles triangle is the amount of the space inside an isosceles triangle. So subtracting 144 from both sides and what do we get? On the left hand side, we have x squared over four is equal to 169 minus 144. That's just x squared over two squared plus 144 144 is equal to 13 squared is 169. This is just the Pythagorean Theorem now. We can write that x over two squared plus the other side plus 12 squared is going to be equal to We can say that x over two squared that's the base right over here this side right over here. Let's use the Pythagorean Theorem on this right triangle on the right hand side. And so now we can use that information and the fact and the Pythagorean Theorem to solve for x. So this is going to be x over two and this is going to be x over two. So they're both going to have 13 they're going to have one side that's 13, one side that is 12 and so this and this side are going to be the same. And since you have twoĪngles that are the same and you have a side between them that is the same this altitude of 12 is on both triangles, we know that both of these So that is going to be the same as that right over there. Because it's an isosceles triangle, this 90 degrees is the Is an isosceles triangle, we're going to have twoĪngles that are the same. You can draw the height so that the isosceles triangle is divided into equal parts. Well the key realization to solve this is to realize that thisĪltitude that they dropped, this is going to form a right angle here and a right angle here and notice, both of these triangles, because this whole thing If you consider a square with a side upon the base (10) of the triangle, you can call the side of the square as 2x the height of the triangle is 12 as you can check by Pythagorean theorem. For example, given a triangle with leg length 8 and base length 6.5, the altitude must be: sqrt (82 - (6.5 / 2)2 sqrt (53.4) 7.3. To find the value of x in the isosceles triangle shown below. To find the altitude of an isosceles triangle with a known leg length and base length, use the following formula: sqrt (L2 - (B / 2)2, where L is the leg length and B is the base length.
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