Answer:
[tex]Longest\ side=20\ inches\\\\Middle\ side=15\ inches\\\\Shortest\ side=6\ inches[/tex]
Step-by-step explanation:
Let be "x" the lenght of the longest side, "y" the lenght of the middle side and "z" the lenght of the shortest side.
The perimeter is:
[tex]41=x+y+z[/tex] [Equation 1]
We know that the longest side is 10 less than twice the middle side length. This can be expressed as:
[tex]x=2y-10[/tex] [Equation 2]
And the middle side length is three less than three times the shortest side length. This is:
[tex]y=3z-3[/tex] [Equation 3]
The steps are:
- Solve for "z" from the third equation:
[tex]y=3z-3\\\\y+3=3z[/tex]
[tex]z=\frac{y+3}{3}[/tex] [Equation 4]
- Substitute [Equation 4] into [Equation 1]
- Substitute [Equation 2] into [Equation 1]
Then:
[tex]41=(2y-10)+y+(\frac{y+3}{3})[/tex]
- Solve for "y":
[tex]41=2y-10+y+\frac{y+3}{3}\\\\41=2y-10+y+\frac{y}{3}+1\\\\41=\frac{10}{3}y-9\\\\41+9=\frac{10}{3}y\\\\\frac{50*3}{10}=y\\\\y=\frac{150}{10}\\\\y=15[/tex]
- Substitute this value into [Equation 2] and into [Equation 4]:
[tex]x=2(15)-10\\\\x=20[/tex]
[tex]z=\frac{(15)+3}{3}\\\\z=6[/tex]
