So to find x we need to add both HI and IJ - which we know equals 7:
[tex] (4x+13)+(x^{2}+3x+4)=7 [/tex]
Then we need to combine like terms:
[tex] x^{2}+7x+17=7 [/tex]
And then set equal to 0:
[tex] x^{2}+7x+10=0 [/tex]
Then we can factor:
[tex] (x+5)(x+2)=0 [/tex]
So then when we set each term equal to 0 individually and solve for x we get: x = -5 and x = -2.
So we have these two values - we need to test which one is correct. So if we go back to the HI segment, let's try plugging in x = -5:
[tex] 4(-5)+13=-7 [/tex]
This gives us a negative number, which we know that length cannot be negative. Let's try x = -2:
[tex] 4(-2)+13=5 [/tex]
This gives us a positive length and therefore we can keep this value.
So the answer is: x = -2.
