express a single natural log: ln(x-3)+ln(x+3)?

express a single natural log: ln(x-3)+ln(x+3)

a. ln(x^2-9)

b. -ln6

c. ln2x

d. ln(2x-9)

e. none

Comments

  • Using

    log(xy) = log x + log y

    the answer is (a):

    ln(x-3)+ln(x+3) = ln[(x-3)(x+3)] = ln(x^2-3x+3x-9) = ln(x^2-9)

  • You will be using the following property to solve this expression:

    ln(a) + ln(b)=ln(ab)

    Your "a" is x-3 and your "b" is x+3. So, the expression can be combined as follows:

    ln(x-3)+ln(x+3)

    ln[(x+3)(x-3)]

    Now you need to follow the FOIL process:

    ln(x^2 - 3x + 3x -9)

    ln(x^2 - 9)

    The answer is ln(x^2 - 9), or letter A.

  • using the laws of logs, by adding them, you can multiply what you have in the brackets to get:

    ln((x-3)(x+3)) = ln(x^2 - 9)

    a

Sign In or Register to comment.