0000:00:00:00:00Start14Number 14ExplanationIf g(x)=3x+2g(x) = 3x + 2g(x)=3x+2 and 2g2(x)−g(x2)−5g(x)=72g^2(x) - g(x^2) - 5g(x) = 72g2(x)−g(x2)−5g(x)=7 are satisfied by x1x_1x1 and x2x_2x2, then the value of x1+x2x_1 + x_2x1+x2 is ...−35-\frac{3}{5}−5315\frac{1}{5}5143\frac{4}{3}3423\frac{2}{3}3235\frac{3}{5}53
14Number 14ExplanationIf g(x)=3x+2g(x) = 3x + 2g(x)=3x+2 and 2g2(x)−g(x2)−5g(x)=72g^2(x) - g(x^2) - 5g(x) = 72g2(x)−g(x2)−5g(x)=7 are satisfied by x1x_1x1 and x2x_2x2, then the value of x1+x2x_1 + x_2x1+x2 is ...−35-\frac{3}{5}−5315\frac{1}{5}5143\frac{4}{3}3423\frac{2}{3}3235\frac{3}{5}53
