QUESTION IMAGE
Question
2a.6 exponential equations iw
equivalence property if $a^m = a^n$, then $m = n$
same base
$6^{-2m} = 6^2$ $3^{3 - 2m} = 3^4$ $5^{-x} = 5^3$ $3^{-x - 1} = 3^{-x}$ $4^{-3b - 3} = 4^3$
one change of base
$5^{3 - 3r} = 25$ $6^{-2m} = 36$ $243 = 3^{-9x}$ $125 = 5^{2x - 3}$ $16 = 4^{3x + 2}$
Same Base Problems
Step1: Set exponents equal
For $6^{-2m}=6^2$, apply equivalence property:
$-2m = 2$
Step2: Solve for m
$m = \frac{2}{-2} = -1$
Step1: Set exponents equal
For $3^{3-2m}=3^4$, apply equivalence property:
$3-2m = 4$
Step2: Isolate term with m
$-2m = 4-3 = 1$
Step3: Solve for m
$m = \frac{1}{-2} = -\frac{1}{2}$
Step1: Set exponents equal
For $5^{-x}=5^3$, apply equivalence property:
$-x = 3$
Step2: Solve for x
$x = -3$
Step1: Set exponents equal
For $3^{-x-1}=3^{-x}$, apply equivalence property:
$-x-1 = -x$
Step2: Simplify equation
$-x + x = 1 \implies 0=1$
This is a contradiction, so no solution exists.
Step1: Set exponents equal
For $4^{-3b-3}=4^3$, apply equivalence property:
$-3b-3 = 3$
Step2: Isolate term with b
$-3b = 3+3 = 6$
Step3: Solve for b
$b = \frac{6}{-3} = -2$
One Change of Base Problems
Step1: Rewrite 25 as $5^2$
For $5^{3-3r}=25$, substitute:
$5^{3-3r}=5^2$
Step2: Set exponents equal
$3-3r = 2$
Step3: Isolate term with r
$-3r = 2-3 = -1$
Step4: Solve for r
$r = \frac{-1}{-3} = \frac{1}{3}$
Step1: Rewrite 36 as $6^2$
For $6^{-2m}=36$, substitute:
$6^{-2m}=6^2$
Step2: Set exponents equal
$-2m = 2$
Step3: Solve for m
$m = \frac{2}{-2} = -1$
Step1: Rewrite 243 as $3^5$
For $243=3^{-9x}$, substitute:
$3^5=3^{-9x}$
Step2: Set exponents equal
$5 = -9x$
Step3: Solve for x
$x = \frac{5}{-9} = -\frac{5}{9}$
Step1: Rewrite 125 as $5^3$
For $125=5^{2x-3}$, substitute:
$5^3=5^{2x-3}$
Step2: Set exponents equal
$3 = 2x-3$
Step3: Isolate term with x
$2x = 3+3 = 6$
Step4: Solve for x
$x = \frac{6}{2} = 3$
Step1: Rewrite 16 as $4^2$
For $16=4^{3x+2}$, substitute:
$4^2=4^{3x+2}$
Step2: Set exponents equal
$2 = 3x+2$
Step3: Isolate term with x
$3x = 2-2 = 0$
Step4: Solve for x
$x = 0$
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Same Base:
- $m=-1$
- $m=-\frac{1}{2}$
- $x=-3$
- No solution
- $b=-2$
One Change of Base:
- $r=\frac{1}{3}$
- $m=-1$
- $x=-\frac{5}{9}$
- $x=3$
- $x=0$