QUESTION 11
Given : [tex]\ln(3x-8)=\ln(x+6)[/tex]
We take antilogarithm of both sides to get:
[tex]3x-8=x+6[/tex]
Group similar terms to get:
[tex]3x-x=6+8[/tex]
Simplify both sides to get:
[tex]2x=14[/tex]
Divide both sides by 2 to obtain:
[tex]x=7[/tex]
12. Given; [tex]\log_3(9x-2)=\log_3(4x+3)[/tex]
We take antilogarithm to obtain:
[tex](9x-2)=(4x+3)[/tex]
Group similar terms to get:
[tex]9x-4x=3+2[/tex]
[tex]5x=5[/tex]
We divide both sides by 5 to get:
[tex]x=1[/tex]
13. [tex]\log(4x+1)=\log25[/tex]
We take antilogarithm to get:
[tex](4x+1)=25[/tex]
Group similar terms
[tex]4x=25-1[/tex]
[tex]4x=24[/tex]
Divide both sides by 4
[tex]x=6[/tex]
14. Given ; [tex]\log_6(5x+4)=2[/tex]
We take antilogarithm to get:
[tex](5x+4)=6^2[/tex]
Simplify:
[tex](5x+4)=36[/tex]
[tex]5x=36-4[/tex]
[tex]5x=32[/tex]
Divide both sides by 5
[tex]x=\frac{32}{5}[/tex]
Or
[tex]x=6\frac{2}{5}[/tex]
15. Given: [tex]\log(10x-7)=3[/tex]
We rewrite in the exponential form to get:
[tex](10x-7)=10^3[/tex]
[tex](10x-7)=1000[/tex]
[tex]10x=1000+7[/tex]
[tex]10x=1007[/tex]
Divide both sides by 10
[tex]x=\frac{1007}{10}[/tex]
16. Given: [tex]\log_3(4x+2)=\log_3(6x)[/tex]
We take antilogarithm to obtain:
[tex](4x+2)=(6x)[/tex]
[tex]2=6x-4x[/tex]
Simplify
[tex]2=2x[/tex]
Divide both sides by 2
[tex]1=x[/tex]
17. Given [tex]\log_2(3x+12)=4[/tex].
We rewrite in exponential form:
[tex](3x+12)=2^4[/tex]
[tex](3x+12)=16[/tex]
[tex]3x=16-12[/tex]
[tex]3x=4[/tex]
Divide both sides by 3
[tex]x=\frac{4}{3}[/tex]
18. Given [tex]\log_3(3x+7)=\log_3(10x)[/tex]
We take antilogarithm to get:
[tex](3x+7)=(10x)[/tex]
Group similar terms:
[tex]7=10x-3x[/tex]
[tex]7=7x[/tex]
We divide both sides by 7
[tex]x=1[/tex]
19. Given: [tex]\log_2x+\log_2(x-3)=2[/tex]
Apply the product rule to simplify the left hand side
[tex]\log_2x(x-3)=2[/tex]
We take antilogarithm to obtain:
[tex]x(x-3)=2^2[/tex]
[tex]x^2-3x=4[/tex]
[tex]x^2-3x-4=0[/tex]
[tex](x-4)(x+1)=0[/tex]
x=-1 or x=4
But x>0, therefore x=4
20. Given [tex]\ln x+ \ln (x+4)=3[/tex]
Apply product rule to the LHS
[tex]\ln x(x+4)=3[/tex]
Rewrite in the exponential form to get:
[tex]x(x+4)=e^3[/tex]
[tex]x^2+4x=e^3[/tex]
[tex]x^2+4x-e^3=0[/tex]
This implies that:
[tex]x=-6.91[/tex] or [tex]x=2.91[/tex]
