Algebra
Calculus
Trigonometry
Matrix
Question
Simplify the expression
2100x2168ds2x2−5m2
Evaluate
ds2×5000400−10510÷(m240×x2)
Cancel out the common factor 200
ds2×252−10510÷(m240×x2)
Cancel out the common factor 5
ds2×252−212÷(m240×x2)
Multiply the terms
ds2×252−212÷m240x2
Use the commutative property to reorder the terms
252ds2−212÷m240x2
Divide the terms
More Steps
Evaluate
212÷m240x2
Multiply by the reciprocal
212×40x2m2
Cancel out the common factor 2
211×20x2m2
Multiply the terms
21×20x2m2
Multiply the terms
420x2m2
252ds2−420x2m2
Rewrite the expression
252ds2−420x2m2
Reduce fractions to a common denominator
25×84x22ds2×84x2−420x2×5m2×5
Multiply the numbers
2100x22ds2×84x2−420x2×5m2×5
Multiply the numbers
2100x22ds2×84x2−2100x2m2×5
Write all numerators above the common denominator
2100x22ds2×84x2−m2×5
Multiply the terms
2100x2168ds2x2−m2×5
Solution
2100x2168ds2x2−5m2
Show Solution
Find the excluded values
m=0,x=0
Evaluate
ds2×5000400−10510÷(m240×x2)
To find the excluded values,set the denominators equal to 0
m2=0m240×x2=0
The only way a power can be 0 is when the base equals 0
m=0m240×x2=0
Solve the equations
More Steps
Evaluate
m240×x2=0
Multiply the terms
m240x2=0
Cross multiply
40x2=m2×0
Simplify the equation
40x2=0
Rewrite the expression
x2=0
The only way a power can be 0 is when the base equals 0
x=0
m=0x=0
Solution
m=0,x=0
Show Solution