Algebra
Calculus
Trigonometry
Matrix
Question
Solve the inequality
Solve the inequality by testing the values in the interval
Solve the inequality by separating into cases
Solve for x
x∈(−∞,0)∪(2log10(2),+∞)
Evaluate
log10(2)×4xlog10(2)×3<log10(2)×(6x2×4)
Remove the parentheses
log10(2)×4xlog10(2)×3<log10(2)×6x2×4
Multiply
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Evaluate
log10(2)×4xlog10(2)×3
Multiply the terms
log10(2)×12xlog10(2)
Use the commutative property to reorder the terms
12log10(2)×xlog10(2)
Multiply the numbers
12(log10(2))2x
12(log10(2))2x<log10(2)×6x2×4
Multiply
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Evaluate
log10(2)×6x2×4
Multiply the terms
log10(2)×24x2
Use the commutative property to reorder the terms
24log10(2)×x2
12(log10(2))2x<24log10(2)×x2
Move the expression to the left side
12(log10(2))2x−24log10(2)×x2<0
Rewrite the expression
12(log10(2))2x−24log10(2)×x2=0
Factor the expression
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Evaluate
12(log10(2))2x−24log10(2)×x2
Rewrite the expression
12log10(2)×xlog10(2)−12log10(2)×x×2x
Factor out 12log10(2)×x from the expression
12log10(2)×x(log10(2)−2x)
12log10(2)×x(log10(2)−2x)=0
When the product of factors equals 0,at least one factor is 0
12log10(2)×x=0log10(2)−2x=0
Solve the equation for x
x=0log10(2)−2x=0
Solve the equation for x
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Evaluate
log10(2)−2x=0
Move the constant to the right-hand side and change its sign
−2x=0−log10(2)
Removing 0 doesn't change the value,so remove it from the expression
−2x=−log10(2)
Change the signs on both sides of the equation
2x=log10(2)
Divide both sides
22x=2log10(2)
Divide the numbers
x=2log10(2)
x=0x=2log10(2)
Determine the test intervals using the critical values
x<00<x<2log10(2)x>2log10(2)
Choose a value form each interval
x1=−1x2=4log10(2)x3=1
To determine if x<0 is the solution to the inequality,test if the chosen value x=−1 satisfies the initial inequality
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Evaluate
12(log10(2))2(−1)<24log10(2)×(−1)2
Rewrite the expression
−12(log10(2))2<24log10(2)×(−1)2
Simplify
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Evaluate
24log10(2)×(−1)2
Evaluate the power
24log10(2)×1
Any expression multiplied by 1 remains the same
24log10(2)
−12(log10(2))2<24log10(2)
Calculate
−1.087429<24log10(2)
Calculate
−1.087429<7.22472
Check the inequality
true
x<0 is the solutionx2=4log10(2)x3=1
To determine if 0<x<2log10(2) is the solution to the inequality,test if the chosen value x=4log10(2) satisfies the initial inequality
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Evaluate
12(log10(2))2×4log10(2)<24log10(2)×(4log10(2))2
Multiply the numbers
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Evaluate
12(log10(2))2×4log10(2)
Reduce the numbers
3(log10(2))2×log10(2)
Multiply the terms
3(log10(2))3
3(log10(2))3<24log10(2)×(4log10(2))2
Multiply the numbers
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Evaluate
24log10(2)×(4log10(2))2
Multiply the terms
23(log10(2))2log10(2)
Multiply the numbers
23(log10(2))2×log10(2)
Multiply the numbers
23(log10(2))3
3(log10(2))3<23(log10(2))3
Calculate
0.081837<23(log10(2))3
Calculate
0.081837<0.040919
Check the inequality
false
x<0 is the solution0<x<2log10(2) is not a solutionx3=1
To determine if x>2log10(2) is the solution to the inequality,test if the chosen value x=1 satisfies the initial inequality
More Steps
Evaluate
12(log10(2))2×1<24log10(2)×12
Any expression multiplied by 1 remains the same
12(log10(2))2<24log10(2)×12
Simplify
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Evaluate
24log10(2)×12
1 raised to any power equals to 1
24log10(2)×1
Any expression multiplied by 1 remains the same
24log10(2)
12(log10(2))2<24log10(2)
Calculate
1.087429<24log10(2)
Calculate
1.087429<7.22472
Check the inequality
true
x<0 is the solution0<x<2log10(2) is not a solutionx>2log10(2) is the solution
Solution
x∈(−∞,0)∪(2log10(2),+∞)
Show Solution
