Answer:
Step-by-step explanation:
Given isosceles triangle DOG with DO≅GO, DO = (n²+1), GO = (4n-2) and DG = (2n -3), you want the value of n and the lengths of the sides.
The expressions for the congruent sides will have the same value, so ...
DG -GO = 0
(n² +1) -(4n -2) = 0
n² -4n +3 = 0 . . . . . . . . simplify
(n -3)(n -1) = 0 . . . . . . factor
n = 1 or 3 . . . . . . . . values of n that make the factors zero
The length of leg DG is ...
2n -3 = 2{1, 3} -3 = {2, 6} -3 = {-1, 3}
Side DG cannot be negative, so the "solution" n = 1 is extraneous.
GO = 4n -2 = 4(3) -2 = 10
The number is 3, the leg lengths are DO = OG = 10, and the base length is DG = 3.