Answer:
Option d
Step-by-step explanation:
given that a, b, c, and d be non-zero real numbers.
[tex]ax(cx + d) = -b(cx+d) \\acx^2+x(ad+bc)+bd =0[/tex]
we can factorise this equation by grouping
[tex](acx^2+xad)+)xbc+bd) =0\\ax(cx+d) +b(cx+d) =0\\(ax+b)(cx+d) =0[/tex]
Equate each factor to 0 to get
[tex]x=\frac{-b}{a} , \frac{-d}{c}[/tex]
Ratio of one solution to another would be
[tex]\frac{-b}{a} / \frac{-d}{c} \\=\frac{ad}{bc}[/tex]
So ratio would be ad/bc
Out of the four options given, option d is equal to this
So option d is right
