PLEASE HELP This question is hard but doable.

Two sides of a (non-degenerate) triangle are 11 and 17. How many possible lengths are there for the third side, if it is a positive integer?

By the triangle inequality, the smaller two sides' lengths must add up to a number larger than the length of the largest side. So either

[tex]x+11>17\implies x>6[/tex]

or

[tex]11+17=28>x[/tex]

In other words, either [tex]x[/tex] is not the largest side length, or it is.

Taken together, we must have [tex]6<x<28[/tex], which yields 22 integer solutions.

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choixongdong choixongdong · Answer 2 · 2018-01-31T21:16:25+01:00

choixongdong choixongdong

31-01-2018

17 - 11 = 6
17 + 11 = 28
6 < third side <28

so any side from 7 to 27 are possible lengths

answer
there are 21 possible lengths for third side if it is a positive integer

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PLEASE HELP This question is hard but doable. Two sides of a (non-degenerate) triangle are 11 and 17. How many possible lengths are there for the third side, if it is a positive integer?

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PLEASE HELP This question is hard but doable.

Two sides of a (non-degenerate) triangle are 11 and 17. How many possible lengths are there for the third side, if it is a positive integer?