Answer:
Option (c) is correct.
The solution of equation is b = 0 and b = 4.
Step-by-step explanation:
The given equation, [tex]\frac{5}{3b^3-3b^2-5}=\frac{2}{b^3-2}[/tex]
We are required to solve the given equation for possible values of b.
Consider,
[tex]\frac{5}{3b^3-3b^2-5}=\frac{2}{b^3-2}[/tex]
Cross multiply ,
[tex]5(b^3-2)=2(3b^3-2b^2-5)[/tex]
Multiply each term of LHS by 5 and RHS by 2 , we get,
[tex]5b^3-10=6b^3-4b^2-10[/tex]
Taking variable terms one sides and constant one side, we get,
[tex]5b^3-6b^3+4b^2=10-10[/tex]
Solving , we get,
[tex]-b^3+4b^2=0[/tex]
Taking [tex]b^2[/tex] common from both terms, we get,
[tex]b^2(4-b)=0[/tex]
[tex]\Rightarrow b^2=0[/tex] and [tex]\Rightarrow 4-b=0[/tex]
[tex]\Rightarrow b=0[/tex] and [tex]\Rightarrow b=4[/tex]
Thus, Option (c) is correct.
The solution of equation is b = 0 and b = 4.
