Math  /  Algebra

QuestionSimplify. Enter the result as a single logarithm with a coefficient of 1. To enter the log, click in the answer cell, then click on the small yellow arrow on the right. Then click the Functions tab to access the log. If needed, you can change the base. Using the keyboard, you can also enter log3(x22)\log _{3}\left(\frac{x^{2}}{2}\right) as log33(x2/2)\log _{3} 3\left(x^{\wedge} 2 / 2\right). log9(6x2)log9(7x)=\log _{9}\left(6 x^{2}\right)-\log _{9}(7 x)= \square

Studdy Solution

STEP 1

What is this asking? We need to combine two *logarithms* with the same *base* into a single *logarithm*, also with a *coefficient* of 1. Watch out! Remember the *logarithm rules*: logb(x)logb(y)=logb(xy)\log_b(x) - \log_b(y) = \log_b(\frac{x}{y}).
Also, don't forget to *simplify* the fraction inside the *logarithm* as much as possible!

STEP 2

1. Combine the logarithms.
2. Simplify the fraction.

STEP 3

We have log9(6x2)log9(7x)\log _{9}\left(6 x^{2}\right)-\log _{9}(7 x).
Since the *bases* are the same, we can use the *logarithm subtraction rule*: logb(x)logb(y)=logb(xy)\log_b(x) - \log_b(y) = \log_b(\frac{x}{y}).
So, we get: log9(6x2)log9(7x)=log9(6x27x) \log _{9}\left(6 x^{2}\right)-\log _{9}(7 x) = \log_9\left(\frac{6x^2}{7x}\right) This is awesome because we've combined the two *logarithms* into one!

STEP 4

Inside the *logarithm*, we have the *fraction* 6x27x\frac{6x^2}{7x}.
We can simplify this by dividing both the *numerator* and the *denominator* by xx.
Remember that x2=xxx^2 = x \cdot x, so dividing x2x^2 by xx gives us xx.
Dividing xx by itself gives us 11.
So, we get: 6x27x=6xx7x=6x7 \frac{6x^2}{7x} = \frac{6x \cdot x}{7x} = \frac{6x}{7}

STEP 5

Now, we can put this simplified *fraction* back into our *logarithm*: log9(6x27x)=log9(6x7) \log_9\left(\frac{6x^2}{7x}\right) = \log_9\left(\frac{6x}{7}\right) Look at that, a single *logarithm* with a *coefficient* of 1!

STEP 6

Our final answer is log9(6x7)\log_9\left(\frac{6x}{7}\right).

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