Question: How do you solve ${5^{x + 2}} = {4^{x + 1}}$?...

Question

How do you solve ${5^{x + 2}} = {4^{x + 1}}$ ?

Answer 1

Solution

In order to solve the above exponential function, we will first take natural logarithm on both side of the equation ,after taking logarithm use the property of logarithm which states that $\ln {m^n} = n\ln m$ ,so rewriting equation and using distributive law to separate out the term as $a(b + c) = ab + ac$ .Now transposing the term having x on the left hand side and constants terms on the right hand side of the equation, combine like terms and transposing everything from LHS to RHS except variable x will give your required solution

Complete step by step solution:
We are Given an exponential function ${5^{x + 2}} = {4^{x + 1}}$ ,
${5^{x + 2}} = {4^{x + 1}}$

Now taking natural logarithm on the both sides, we get
$\ln {5^{x + 2}} = \ln {4^{x + 1}}$

Now using property of logarithm on both side $\ln {m^n} = n\ln m$
$\left( {x + 2} \right)\ln 5 = \left( {x + 1} \right)\ln 4$

Using property of distributive $a(b + c) = ab + ac$
$x\ln 5 + 2\ln 5 = x\ln 4 + \ln 4$

Now transposing terms having x on the left-hand side and constants term on the right hand side

x\ln 5 - x\ln 4 = \ln 4 - 2\ln 5 \\\ \dfrac{{x(\ln 5 - \ln 4)}}{{(\ln 5 - \ln 4)}} = \dfrac{{\ln 4 - 2\ln 5}}{{(\ln 5 - \ln 4)}} \\\ x = \dfrac{{(\ln 4 - 2\ln 5)}}{{(\ln 5 - \ln 4)}} \\\

Therefore, the solution to the exponential function ${5^{x + 2}} = {4^{x + 1}}$ is equal to
$\dfrac{{(\ln 4 - 2\ln 5)}}{{(\ln 5 - \ln 4)}}$ .

Additional Information: 1.Value of constant ‘e’ is equal to $2.71828$ .

2.A logarithm is basically the reverse of a power or we can say when we calculate a logarithm of any number, we actually undo an exponentiation.

3.Any multiplication inside the logarithm can be transformed into addition of two separate logarithm values.

${\log _b}(mn) = {\log _b}(m) + {\log _b}(n)$

4. Any division inside the logarithm can be transformed into subtraction of two separate logarithm values.

${\log _b}\left( {\dfrac{m}{n}} \right) = {\log _b}(m) - {\log _b}(n)$

5. Any exponent value on anything inside the logarithm can be transformed and moved out of the logarithm as a multiplier and vice versa.

$n\log m = \log {m^n}$

Note: 1.Don’t forget to cross-check your answer at least once.

2. $\ln$ is known as the “natural log” which is having base $e$

Question: How do you solve \({5^{x + 2}} = {4^{x + 1}}\)?...

Solution