Exponential Equations and Inequalities - Pre-Calculus

Card 0 of 40

Solve for x:

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$log_4 (3x-2)=2\rightarrow $3x-2=4^2$\rightarrow 3x=18\rightarrow x=6$

Simplify the log expression:

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The logarithmic expression is as simplified as can be.

Solving an exponential equation.

Solve for ,

.

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We recall the property:

$log_b(x)=y \leftrightarrow $b^y$=x$

Now, .

Thus

.

Solving an exponential equation.

Solve

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Use (which is just , by convention) to solve.

$x=\frac{2}{3}$$ .

Solve

.

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After using the division rule to simplify the left hand side you can take the natural log of both sides.

If you then combine like terms you get a quadratic equation which factors to,

.

Setting each binomial equal to zero and solving for we get the solution to be .

Solve the equation for using the rules of logarithms.

$\ln(17x)+\ln\left($\frac{x}{3}\right)+\log_$3(x^2$)=4$

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Expanding the logarithms into sums of logarithms will cancel out the first two x terms, resulting in the equation:

$\ln(17)+ln(3)+2\log_3(x)=4$

Combining the first and second terms, then subtracting the new term over will allow you to isolate the variable term.

Divide both sides of the equation by 2, then exponentiate with 3.

Evaluating this term numerically will give the correct answer.

$2\log_3(x)=4-\ln(51)\implies \log_3(x)=2-$\frac{\ln(51)}{2}$\ \ \implies $x=3^{2-\ln(51)/2}$\approx1.04$

Solve the following equation:

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To solve this equation, recall the following property:

Can be rewritten as

Evaluate with your calculator to get

$x\approx2.24$

Solve for x:

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Solve for x in the following equation:

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Solve for x using the rules of logarithms:

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$log_3 $\frac{2x}{x-3}$=1\rightarrow $3^{log_3 $\frac{2x}$${x-3}$}=3^1$\rightarrow $\frac{2x}{x-3}$=3\rightarrow x=9$

Solve for x:

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$log_4 (3x-2)=2\rightarrow $3x-2=4^2$\rightarrow 3x=18\rightarrow x=6$

Simplify the log expression:

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The logarithmic expression is as simplified as can be.

Solving an exponential equation.

Solve for ,

.

Tap to see back →

We recall the property:

$log_b(x)=y \leftrightarrow $b^y$=x$

Now, .

Thus

.

Solving an exponential equation.

Solve

Tap to see back →

Use (which is just , by convention) to solve.

$x=\frac{2}{3}$$ .

Solve

.

Tap to see back →

After using the division rule to simplify the left hand side you can take the natural log of both sides.

If you then combine like terms you get a quadratic equation which factors to,

.

Setting each binomial equal to zero and solving for we get the solution to be .

Solve the equation for using the rules of logarithms.

$\ln(17x)+\ln\left($\frac{x}{3}\right)+\log_$3(x^2$)=4$

Tap to see back →

Expanding the logarithms into sums of logarithms will cancel out the first two x terms, resulting in the equation:

$\ln(17)+ln(3)+2\log_3(x)=4$

Combining the first and second terms, then subtracting the new term over will allow you to isolate the variable term.

Divide both sides of the equation by 2, then exponentiate with 3.

Evaluating this term numerically will give the correct answer.

$2\log_3(x)=4-\ln(51)\implies \log_3(x)=2-$\frac{\ln(51)}{2}$\ \ \implies $x=3^{2-\ln(51)/2}$\approx1.04$

Solve the following equation:

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To solve this equation, recall the following property:

Can be rewritten as

Evaluate with your calculator to get

$x\approx2.24$

Solve for x:

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Solve for x in the following equation:

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Solve for x using the rules of logarithms:

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$log_3 $\frac{2x}{x-3}$=1\rightarrow $3^{log_3 $\frac{2x}$${x-3}$}=3^1$\rightarrow $\frac{2x}{x-3}$=3\rightarrow x=9$