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The measures of the sides of a triangle are in the extended ratio 2 : 5 : 11, The perimeter is 90ft. Which of the following lengths is the shortest side?

A. 2 feet

B. 10 feet

C. 5 feet

The measures of the sides of a triangle are in the extended ratio 2 5 11 The perimeter is 90ft Which of the following lengths is the shortest side A 2 feet B 10 class=

Respuesta :

Add the proportion
2+5+11=18
Divide 90 by 18
Multiply the result of 90/18 by the shortest side (2 in this case) to get the final answer.

Answer:

Shortest side of the triangle is 10 feet .

Option (B) is correct .

Step-by-step explanation:

As given

The measures of the sides of a triangle are in the extended ratio 2 : 5 : 11 .

The perimeter is 90ft.

Let us assume that the x be the multiple of all sides .

Than,

One side of the triangle = 2x

Second side of the triangle = 5x

Third side of the triangle = 11x

As the  perimeter of a triangle is the sum of all three sides of a triangle .

Thus

2x + 5x + 11x = 90

18x =  90

[tex]x = \frac{90}{18}[/tex]

x = 5

One side of the triangle = 2x

                                       = 2 × 5

                                        = 10 feet

Second side of the triangle = 5x

                                             = 5 × 5

                                            = 25 feet

Third side of the triangle = 11x

                                         = 11 × 5

                                         = 55 feet

Therefore shortest side of the triangle is 10 feet .

Option (B) is correct .

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