Answer:
Option C is correct.
Exact solution of [tex]2^{x+2} = 5^{2x}[/tex] is, [tex]\frac{2\ln 2}{2\ln 5 - \ln 2}[/tex]
Step-by-step explanation:
Given the equation: [tex]2^{x+2} = 5^{2x}[/tex]
Using logarithmic rules:
- [tex]a^x=b^y[/tex] ⇒ [tex]x \ln a =y \ln b[/tex]
- [tex]\ln x^a = a\ln x[/tex]
Given: [tex]2^{x+2} = 5^{2x}[/tex]
Taking logarithmic both sides:
[tex]\ln 2^{x+2} = \ln 5^{2x}[/tex]
By logarithmic rules;
[tex](x+2) \ln 2 = (2x) \ln 5[/tex]
Using distributive property i.e [tex]a\cdot (b+c) = a\cdot b + a\cdot c[/tex]
[tex]x \ln 2 +2 \ln 2 = 2x \ln 5[/tex]
Subtract [tex]x \ln 2[/tex] from both sides we get;
[tex]x \ln 2 +2 \ln 2 - x \ln 2= 2x \ln 5 - x \ln 2[/tex]
Simplify:
[tex]2 \ln 2= 2x \ln 5 - x \ln 2[/tex]
or
[tex]2 \ln 2= x (2\ln 5 - \ln 2)[/tex]
Divide both sides by [tex] (2\ln 5 - \ln 2)[/tex] we get;
[tex]\frac{2\ln 2}{2\ln 5 - \ln 2} = x[/tex]
Therefore, the exact solution of the given equation is [tex]\frac{2\ln 2}{2\ln 5 - \ln 2}[/tex]
