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Help this poor soul with the homework (•‿•)

find the length of the missing side of the triange shown below. round to the nearest tenth,if nessesary


Help this poor soul with the homework (•‿•) find the length of the missing side of-example-1
User David Hull
by
2.9k points

2 Answers

19 votes
19 votes

Answer:

The altitude of triangle is 8 in.

Explanation:

Solution :

Here, we have given that the two sides of triangle are 17 in and 15 in.

Finding the third side of triangle by pythagoras theorem formula :


{\longrightarrow{\pmb{\sf{{(Base)}^(2) + {(Altitude)}^(2) = {(Hypotenuse)}^(2)}}}}


  • \pink\star Base = 15 in

  • \pink\star Hypotenuse = 17 in

  • \pink\star Altitude = ?

Substituting all the given values in the formula to find the third side of triangle :


\begin{gathered}\qquad{\longrightarrow{\sf{{(Base)}^(2) + {(Altitude)}^(2) = {(Hypotenuse)}^(2)}}}\\\\\quad{\longrightarrow{\sf{{(15)}^(2) + {(Altitude)}^(2) = {(17)}^(2)}}}\\\\\quad{\longrightarrow{\sf{{(15 * 15)} + {(Altitude)}^(2) = {(17 * 17)}}}}\\\\\quad{\longrightarrow{\sf{{(225)} + {(Altitude)}^(2) = {(289)}}}}\\\\\quad{\longrightarrow{\sf{{(Altitude)}^(2) = {(289)} - (225)}}}\\\\\quad{\longrightarrow{\sf{{(Altitude)}^(2) = 289 - 225}}}\\\\\quad{\longrightarrow{\sf{{(Altitude)}^(2) = 64}}}\\\\\quad{\longrightarrow{\sf{Altitude = √(64)}}}\\\\\quad{\longrightarrow{\sf{Altitude = 8 \: in}}}\\\\\quad{\star{\underline{\boxed{\sf{\red{Altitude = 8 \: in}}}}}}\end{gathered}

Hence, the altitude of triangle is 8 in.


\rule{300}{2.5}

User Jonbonazza
by
2.4k points
22 votes
22 votes

Answer:

8 inches

Explanation:

Use Pythagorean theorem,

Base² + altitude² = hypotenuse²

15²+ altitude² = 17²

225 + altitude² = 289

altitude² = 289 - 225 = 64

altitude = √64 = 8 in

User Benjamin West
by
3.2k points