I get the same solutions by squaring both sides and solving (after rearranging the terms) the resultant polynomial x^4+8x^3+9x^2+18x+10=0. Clearly (x-1) is a factor so after division we're left with x^3+9x^2+8x+10=0. (x+1) is a factor so after further division we have x^2+8x+10=0 with solutions x=-4+-SQRT(6). Remaining solutions are, of course, x=1, x=-1

My solution, before being able to watch the video: The equation to solve is (x + 2)² = √(15x² + 40x + 26) Square both sides and we get (x + 2)⁴ = 15x² + 40x + 26 x⁴ + 8x³ + 24x² + 32x + 16 = 15x² + 40x + 26 x⁴ + 8x³ + 9x² − 8x − 10 = 0 x⁴ + 8x(x² − 1) + 9x² − 10 = 0 x²(x² − 1) + 8x(x² − 1) + 10x² − 10 = 0 x²(x² − 1) + 8x(x² − 1) + 10(x² − 1) = 0 (x² − 1)(x² + 8x + 10) = 0 (x − 1)(x + 1)((x + 4)² − 6) = 0 x − 1 = 0 ⋁ x + 1 = 0 ⋁ (x + 4)² − 6 = 0 x = 1 ⋁ x = −1 ⋁ x = −4 + √6 ⋁ x = −4 − √6 So we have four real solutions, but now we still need to verify these solutions because the radicand 15x² + 40x + 26 at the right hand side of the original equation must not be negative. It is easy to see that this condition is satisfied for x = 1 and x = −1, but what about the irrational solutions x = −4 + √6 and x = −4 − √6 which are both negative? Note that you are _not allowed to use a calculator_ when solving problems that appeared on math contests. We can proceed as follows. Note that x = −4 + √6 and x = −4 − √6 are both solutions of the quadratic x² + 8x + 10 = 0 so for each of these values of x we have x² = −8x − 10 and therefore 15x² + 40x + 26 = 15(−8x − 10) + 40x + 26 = −80x − 124 So, for x = −4 − √6 we have 15x² + 40x + 26 = −80x − 124 = −80(−4 − √6) − 124 = 196 + 80√6 which is evidently positive. But for x = −4 + √6 we have 15x² + 40x + 26 = −80x − 124 = −80(−4 + √6) − 124 = 196 − 80√6 and it is not immediately obvious whether this is positive or negative. So how do we decide this _without_ using any calculating device? Well, we have (196 + 80√6)(196 − 80√6) = 196² − (80√6)² = (200 − 4)² − 6400·6 = 40000 − 1600 + 16 − 36000 − 2400 = 40000 − 36000 − 4000 + 16 = 16 So, since 196 + 80√6 is positive and since the product of 196 + 80√6 and 196 − 80√6 is positive, this means that 196 − 80√6 itself must also be positive. So, for x = −4 + √6 the radicand 15x² + 40x + 26 = 196 − 80√6 is indeed positive. Therefore, all four solutions x = 1 ⋁ x = −1 ⋁ x = −4 + √6 ⋁ x = −4 − √6 are accepted as solutions of the equation (x + 2)² = √(15x² + 40x + 26).