Algebra
Calculus
Trigonometry
Matrix
Question
Simplify the expression
48b1−1152b
Evaluate
1÷48b−24
Rewrite the expression
48b1−24
Reduce fractions to a common denominator
48b1−48b24×48b
Write all numerators above the common denominator
48b1−24×48b
Solution
48b1−1152b
Show Solution
Find the excluded values
b=0
Evaluate
1÷(48b)−24
To find the excluded values,set the denominators equal to 0
48b=0
Solution
b=0
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Find the roots
b=11521
Alternative Form
b≈0.000868
Evaluate
1÷(48b)−24
To find the roots of the expression,set the expression equal to 0
1÷(48b)−24=0
Find the domain
1÷(48b)−24=0,b=0
Calculate
1÷(48b)−24=0
Multiply the terms
1÷48b−24=0
Rewrite the expression
48b1−24=0
Subtract the terms
More Steps
Simplify
48b1−24
Reduce fractions to a common denominator
48b1−48b24×48b
Write all numerators above the common denominator
48b1−24×48b
Multiply the terms
48b1−1152b
48b1−1152b=0
Cross multiply
1−1152b=48b×0
Simplify the equation
1−1152b=0
Move the constant to the right side
−1152b=0−1
Removing 0 doesn't change the value,so remove it from the expression
−1152b=−1
Change the signs on both sides of the equation
1152b=1
Divide both sides
11521152b=11521
Divide the numbers
b=11521
Check if the solution is in the defined range
b=11521,b=0
Solution
b=11521
Alternative Form
b≈0.000868
Show Solution