Solve the exponential equation.900=10x+17900=10^{x+17}900=10x+17

x = − 14.05 x=-14.05 x = − 14.05

Solve the exponential equation. 900 = 1 0 x + 17 900=10^{x+17} 900 = 1 0 x + 17

In this problem, we're asked to solve the exponential equation. And here we're given the equation 900 is equal to 10 to the power of x plus 17. Now let's go ahead and get started with step 1 and isolate our exponential expression. But our exponential expression is actually already isolated. It's this 10 to the power of x plus 17, so we're good on step 1. We can move on to step 2. Now in step 2, we want to check if there is a base 10 or not a base 10, and it looks like, yes, we do have a base 10, so we're to just use log, the common log. So taking the log of both sides, I'm going to get log of 900 is equal to log of 10 to the power of x plus 17. Now that step 2 is done, we can move on to step 3 and use our log rules to get x out of the exponent. So in order to do that, I'm going to use the power rule and pull this x plus 17 to the front of my log. So this is log of 900 is equal to x plus 17 times log of 10. Now we can go ahead and simplify this further using log rules because we know that log of 10 is really just 1, so this goes away. It's just 1, and this is just log of 900 is equal to x plus 17. Now that we've completed step 3, we can go ahead and just solve for x. So solving for x here, I only have one thing to do, and that's subtract this 17 from both sides. Now whenever you rewrite this, you need to be careful and use parentheses where needed, or you can just put the 17 in at the front. It is up to you, but we just wanna make sure that we are not making it seem like that 17 is being subtracted from the 900 because log 900 is something by itself and we're subtracting 17 from that. So this is a log of 900. I'm gonna go ahead and use parentheses and then minus 17, and that's equal to x. Now if you're just using this in the log form, you can go ahead and stop here. But since we were done with step 4, we can go ahead and approximate this using a calculator. Now plugging this into your calculator, make sure to use parentheses where appropriate because we're just taking the log of 900 and then subtracting 17 from that. Now when you do that, you'll end up getting negative 14.05, rounding to that nearest hundredth place, and that is equal to x. And here is our final answer. Thanks for watching, and I'll see you in the next one.

Solve the exponential equation. 900 = 1 0 x + 17 900=10^{x+17} 900 = 1 0 x + 17

x = − 14.05 x=-14.05 x = − 14.05

6. Exponential & Logarithmic Functions

Solving Exponential and Logarithmic Equations

College Algebra

6. Exponential & Logarithmic Functions

Solving Exponential and Logarithmic Equations

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Multiple Choice

Solve the exponential equation.
$900=10^{x+17}$

$x=-14.05$

$x=2.95$

$x=0.17$

$x=1.72$

Verified step by step guidance

Start by isolating the exponential term. The given equation is 900 = 10^{x+17}. To isolate the exponential term, divide both sides of the equation by 10^{17}.

This results in the equation 900 / 10^{17} = 10^x. Simplify the left side of the equation to get a numerical value.

Next, apply the logarithm to both sides of the equation to solve for x. Use the property that if a = b^c, then log_b(a) = c.

Take the logarithm base 10 of both sides: log_{10}(900 / 10^{17}) = log_{10}(10^x). This simplifies to x = log_{10}(900 / 10^{17}).

Calculate the value of the logarithm to find the value of x. This will give you the solution to the equation.

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