The perimeter of the triangle is the distance around it.
In the case of our triangle, the distance around it is
[tex](2a-3)+(3a+1)+2a[/tex]
which we are told is 40 units; therefore,
[tex](2a-3)+(3a+1)+2a=40[/tex]
Simplifying the expression on the left side of the equation (adding like terms) gives us
[tex]7a-2=40[/tex]
Now we solve for a by adding 2 to both sides of the equation and then dividing by 7:
[tex]7a=40+2[/tex][tex]a=\frac{42}{7}[/tex][tex]\textcolor{#FF7968}{\therefore a=6.}[/tex]
Now we are in a position to compute the length of the longest side.
The longest side is 3a+1 and it evaluates to
[tex]3a+1=3(6)+1=19.[/tex]
The longest side is 19 units.
The shortest side is 2a-3 and it evaluates to
[tex]2a-3=2(6)-3=9[/tex]
The shortest side is 9 units.
Therefore, the difference of length between the longest side and the shortest side is
[tex]19-9=10[/tex]
Hence, the longest side is 10 units bigger than the shortest side.
