Question

hi, i dont undertand number 20 because i was absent in class today and i rerally need help, i will appraciate with the help, and shows me every step thank you

Answer 1

Given:

The equation is,

`2\log _3x-\log _3(x-2)=2`

Step-by-step explanation:

Simplify the equation by using logarthimic property.

`\begin{gathered} 2\log _3x-\log _3(x-2)=2 \\ \log _3x^2-\log _3(x-2)=2_{}\text{ \lbrack{}log(a)-log(b) = log(a/b)\rbrack} \\ \log _3\lbrack(x^2)/(x-2)\rbrack=2 \end{gathered}`

Simplify further.

`\begin{gathered} \log _3\lbrack(x^2)/(x-2)\rbrack=2 \\ (x^2)/(x-2)=3^2 \\ x^2=9(x-2) \\ x^2-9x+18=0 \end{gathered}`

Solve the quadratic equation for x.

`\begin{gathered} x^2-6x-3x+18=0 \\ x(x-6)-3(x-6)=0 \\ (x-6)(x-3)=0 \end{gathered}`

From the above equation (x - 6) = 0 or (x - 3) = 0.

For (x - 6) = 0,

`\begin{gathered} x-6=0 \\ x=6 \end{gathered}`

For (x - 3) = 0,

`\begin{gathered} x-3=0 \\ x=3 \end{gathered}`

The values of x from solving the equations are x = 3 and x = 6.

Substitute the values of x in the equation to check answers are valid or not.

For x = 3,

`\begin{gathered} 2\log _3(3^{})-\log _3(3-2)=2 \\ 2\log _33-\log _31=2 \\ 2\cdot1-0=2 \\ 2=2 \end{gathered}`

Equation satisfy for x = 3. So x = 3 is valid value of x.

For x = 6,

`\begin{gathered} 2\log _36-\log _3(6-2)=2 \\ 2\log _36-\log _34=2 \\ \log _3(6^2)-\log _34=2 \\ \log _3((36)/(4))=2 \\ \log _39=2 \\ \log _3(3^2)=2 \\ 2\log _33=2 \\ 2=2 \end{gathered}`

Equation satifies for x = 6.

Thus values of x for equation are x = 3 and x = 6.