Algebra
Calculus
Trigonometry
Matrix
Question
Simplify the expression
h4h5−713
Evaluate
h−h4713
Reduce fractions to a common denominator
h4h×h4−h4713
Write all numerators above the common denominator
h4h×h4−713
Solution
More Steps
Evaluate
h×h4
Use the product rule an×am=an+m to simplify the expression
h1+4
Add the numbers
h5
h4h5−713
Show Solution
Find the excluded values
h=0
Evaluate
h−h4713
To find the excluded values,set the denominators equal to 0
h4=0
Solution
h=0
Show Solution
Find the roots
h=5713
Alternative Form
h≈3.720642
Evaluate
h−h4713
To find the roots of the expression,set the expression equal to 0
h−h4713=0
The only way a power can not be 0 is when the base not equals 0
h−h4713=0,h=0
Calculate
h−h4713=0
Subtract the terms
More Steps
Simplify
h−h4713
Reduce fractions to a common denominator
h4h×h4−h4713
Write all numerators above the common denominator
h4h×h4−713
Multiply the terms
More Steps
Evaluate
h×h4
Use the product rule an×am=an+m to simplify the expression
h1+4
Add the numbers
h5
h4h5−713
h4h5−713=0
Cross multiply
h5−713=h4×0
Simplify the equation
h5−713=0
Move the constant to the right side
h5=713
Take the 5-th root on both sides of the equation
5h5=5713
Calculate
h=5713
Check if the solution is in the defined range
h=5713,h=0
Solution
h=5713
Alternative Form
h≈3.720642
Show Solution