We can graph this equation by first completing a table of values and drawing the curve that passes through these points, or we can consider how the function f\left(x\right)=\log_{10}\left(x\right) has been transformed.

Considering each component separately, we can see that the graph of y=\log_{10}\left(x\right) is translated 3 units to the left, and then dilated vertically by a factor of 7.

y=x+2 is a straight line with a slope of 1 and a y-intercept of 2

The solutions to the equation will be the points where the two graphs intersect.

Rounding to the nearest integer, we get the solutions x=-2 and x=4.

We can confirm that x=-2 is exactly a solution algebraically, as the left hand side of the equation becomes 7\log_{10}\left(1\right)= 0, and the right hand side becomes -2+2=0, as expected. We cannot do the same for x=4, which tells us that this solution must have been rounded.

We can rewrite the left hand side using the corollary of the product law of logarithms: \log_b\left(x\right)+ \log_b\left(y\right) =\log_b\left(xy\right) We can then use the identity \log_b x=n \iff x=b^n , to rewrite the expression without logarithms.

To test for extraneous solutions we want to check if any solution falls outside the domain of the logarithms. We cannot take the logarithm of a negative value, so the domain for this equation is \left(0, \infty\right).

This gives us two possible solutions x=3 and x=-12.

We now need to check if either is extraneous. As -12 < 0, it falls outside the domain of the function and is therefore extraneous.

x=3 is a valid solution.

We can check our solution by substituting x=3 into the equation:

Substituting x=3 makes the equation true, so we confirm that it is a valid solution.

We can rewrite the left hand side using the corollary of the quotient law of logarithms: \log_b\left(x\right)- \log_b\left(y\right) =\log_b\left(\frac{x}{y}\right) This will give us an equation of the form \log_b\left(x\right)=\log_b\left(y\right) which we can simplify using the equality law\log_b\left(x\right)=\log_b\left(y\right) \iff x=y

To test for extraneous solutions we want to check if any solution falls outside the domain of the logarithms. We cannot take the logarithm of a negative value so the domain for this equation is \left(2, \infty\right) since, \log_n(x-2), will be negative for any value of x less than 2.

This gives us two possible solutions x=-1 and x=4.

We now need to check if either is extraneous. As -1 <2, it falls outside the domain of the function and is therefore extraneous.

x=4 is a valid solution.

We can check our solution by substituting x=4 into the equation:

We can see that 1024 is a power of 2, so by first rewriting this as a power with a base of 2, we can simplify the process needed to solve this equation.

When we arrive at an equation such as 2^{1-2x}=2^{10} where both terms have the same base, we can simplify the process of taking logarithms by equating the terms in the exponent.

In this case, we have two equal terms with a base of 2, which means their respective exponents must be equal. That is, 1-2x=10.

The inverse of e^x is \ln(x) so we can take the \ln of both sides to cancel out the e.

The exact answer is x=\dfrac{\ln(4)-3}{2}.

We can find an approximate solution using technology, x\approx -0.8069.