Question
Simplify the expression
4088483k26625e
Evaluate
e÷1252021k÷2132023
Divide the terms
More Steps
Evaluate
e÷1252021k
Rewrite the expression
e÷1252021k
Multiply by the reciprocal
e×2021k125
Multiply the terms
2021ke×125
Use the commutative property to reorder the terms
2021k125e
2021k125e÷2132023
Multiply by the reciprocal
2021k125e×2023213
Multiply the terms
2021k×2023125e×213
Multiply the terms
2021k×202326625e
Solution
4088483k26625e
Show Solution
Find the excluded values
k=0
Evaluate
e÷(1252021k)÷2132023
To find the excluded values,set the denominators equal to 0
1252021k=0
Solution
k=0
Show Solution
Find the roots
k∈∅
Evaluate
e÷(1252021k)÷2132023
To find the roots of the expression,set the expression equal to 0
e÷(1252021k)÷2132023=0
Find the domain
e÷(1252021k)÷2132023=0,k=0
Calculate
e÷(1252021k)÷2132023=0
Multiply the terms
e÷1252021k÷2132023=0
Divide the terms
More Steps
Evaluate
e÷1252021k
Rewrite the expression
e÷1252021k
Multiply by the reciprocal
e×2021k125
Multiply the terms
2021ke×125
Use the commutative property to reorder the terms
2021k125e
2021k125e÷2132023=0
Divide the terms
More Steps
Evaluate
2021k125e÷2132023
Multiply by the reciprocal
2021k125e×2023213
Multiply the terms
2021k×2023125e×213
Multiply the terms
2021k×202326625e
Multiply the terms
4088483k26625e
4088483k26625e=0
Cross multiply
26625e=4088483k×0
Simplify the equation
26625e=0
Calculate
72374.253683=0
Solution
k∈∅
Show Solution