The two shortest sides of a right triangle are 10 inches and 24 inches long. What is the length of the shortest side of a similar right triangle whose two longest sides are 36 inches and 39 inches?

Question

superkoopasirf · Answer

If the two shortest sides of the triangle are 10in and 24in, then using Pythagoras' theorem, the longest side = 1 0 2 + 2 4 2 ​ 
= 676 ​ = 26 
 Now we know the two longest sides of the first triangle (24in and 26in) we can compare them with the two longest sides of the second triangle. If x = the scale factor the first triangle is enlarged by then 26 x = 39 and 24 x = 36 
⇒ x = 1.5 
 Finally, we need to multiply the smallest side of the first triangle by the scale factor to find the shortest side of the second triangle. 10 ( 1.5 ) = 15 So the length of the shortest side of the other triangle is 15in. 
 You could, instead, calculate the length of the shortest side of the second triangle by using Pythagoras' theorem and ignoring the first triangle completely.

mathdragon · Answer

Draw two triangles. label the legs 10 in and 24 in on the first. On the second note that the longest side of a right triangle is the hypotenuse, and label the hypotenuse 39, and a leg 36 in. 
 Since the triangle are similar, all the sides will be in direct proportion to each other. 
 36/24 = 1.5 so the second triangle has side lengths that are 1.5 times longer than the first. 1.5 x 10 = 15 
 the shortest side of the second right triangle is 15 in.

superkoopasirf · Answer

The length of the shortest side of the similar right triangle is 15 inches. This was determined using the scale factor obtained from the relationship between the sides of the two triangles. The original triangle has sides of 10 inches, 24 inches, and 26 inches, while the similar triangle has sides proportional to 36 inches and 39 inches. 
 ;

The two shortest sides of a right triangle are 10 inches and 24 inches long. What is the length of the shortest side of a similar right triangle whose two longest sides are 36 inches and 39 inches?

Answer (3)

Related Questions in Mathematics

📝 Answered - Select the correct answer. Which equation is equivalent to the given equation? [tex]$x^2-6 x=8$[/tex] A. [tex]$(x-6)^2=44$[/tex] B. [tex]$(x-3)^2=17$[/tex] C. [tex]$(x-6)^2=20$[/tex] D. [tex]$(x-3)^2=14$[/tex]

📝 Answered - Which phrase best describes the translation from the graph [tex]y=6 x^2[/tex] to the graph of [tex]y=6(x+1)^2[/tex]? A. 6 units left B. 6 units right C. 1 unit left D. 1 unit right

📝 Answered - What expression is equivalent to [tex]$\left(5 z^2+3 z+2\right)^2$[/tex] ? A. [tex]$5 z^4+3 z^2+4$[/tex] B. [tex]$5 z^4+9 z^2+4$[/tex] C. [tex]$25 z^4+30 z^3+19 z^2+12 z+4$[/tex] D. [tex]$25 z^4+30 z^3+29 z^2+12 z+4$[/tex]

📝 Answered - The graph of [tex]y=\frac{5}{4} x+1[/tex] is shown below. The coordinate ([tex]0, y[/tex]) is a solution of the equation. Given the [tex]x[/tex]-value of 0, what is the value of the [tex]y[/tex]-coordinate for the coordinate ([tex]0, y[/tex])? [tex]y=[/tex] [blank]

📝 Answered - If [tex]f(-2)=0[/tex], what are all the factors of the function [tex]f(x)=x^3-2 x^2-68 x-120[/tex]? Use the Remainder Theorem. A. [tex](x+2)(x+60)[/tex] B. [tex](x-2)(x-60)[/tex] C. [tex](x-10)(x+2)(x+6)[/tex] D. [tex](x+10)(x-2)(x-6)[/tex]