How do you solve #sqrt(56-r)=r#?
1 Answer
Explanation:
Square both sides to get
#56 - r = r^2#
Then gather terms to get
#r^2 + r - 56 = 0.#
This is a simple quadratic, which can be solved by the quadratic formula, or, more simply, by factoring, into
#(r - 7)(r +8) = 0#
Setting each factor equal to zero in turn gives
#r - 7 = 0 implies r = 8" "# and#" "r + 8 = 0 implies r = -8#
To check,
#sqrt(56 - 7) = sqrt(49) = 7#
#sqrt(56 - (-8)) = sqrt(64) != -8 -># this means that#r=-8# is not a solution to the original equation.
