Question
Simplify the expression
Solution
14622026050915x2+73112156305490x+73136468916470
Evaluate
2026050915÷34÷43(x+6)2
Rewrite the expression
342026050915÷43(x+6)2
Divide the terms
More Steps
Evaluate
342026050915÷43
Multiply by the reciprocal
342026050915×431
To multiply the fractions,multiply the numerators and denominators separately
34×432026050915
Multiply the numbers
14622026050915
14622026050915(x+6)2
Expand the expression
More Steps
Evaluate
(x+6)2
Use (a+b)2=a2+2ab+b2 to expand the expression
x2+2x×6+62
Calculate
x2+12x+36
14622026050915(x2+12x+36)
Apply the distributive property
14622026050915x2+14622026050915×12x+14622026050915×36
Multiply the numbers
More Steps
Evaluate
14622026050915×12
Reduce the numbers
7312026050915×6
Multiply the numbers
7312026050915×6
Multiply the numbers
73112156305490
14622026050915x2+73112156305490x+14622026050915×36
Solution
More Steps
Evaluate
14622026050915×36
Reduce the numbers
7312026050915×18
Multiply the numbers
7312026050915×18
Multiply the numbers
73136468916470
14622026050915x2+73112156305490x+73136468916470
Show Solution
Find the roots
Find the roots of the algebra expression
x=−6
Evaluate
2026050915÷34÷43(x+6)2
To find the roots of the expression,set the expression equal to 0
2026050915÷34÷43(x+6)2=0
Rewrite the expression
342026050915÷43(x+6)2=0
Divide the terms
More Steps
Evaluate
342026050915÷43
Multiply by the reciprocal
342026050915×431
To multiply the fractions,multiply the numerators and denominators separately
34×432026050915
Multiply the numbers
14622026050915
14622026050915(x+6)2=0
Rewrite the expression
(x+6)2=0
The only way a power can be 0 is when the base equals 0
x+6=0
Move the constant to the right-hand side and change its sign
x=0−6
Solution
x=−6
Show Solution