Solve the Following Quadratic Equation by Factorization

Question:

Solve the quadratic equation:

\[ \frac{16}{x}-1=\frac{15}{x+1}, \qquad x\ne 0,-1 \]

Solution

Given:

\[ \frac{16}{x}-1=\frac{15}{x+1} \]

Multiplying both sides by \(x(x+1)\), we get:

\[ 16(x+1)-x(x+1)=15x \] \[ 16x+16-x^2-x=15x \] \[ -x^2+15x+16=15x \] \[ -x^2+16=0 \] \[ x^2-16=0 \]

Using the identity \(a^2-b^2=(a-b)(a+b)\):

\[ (x-4)(x+4)=0 \]

Therefore,

\[ x-4=0 \quad \text{or} \quad x+4=0 \] \[ x=4 \quad \text{or} \quad x=-4 \]

Both values satisfy the condition \(x\ne0,-1\).

Final Answer

\[ \boxed{x=4 \text{ or } x=-4} \]