Algebra
Calculus
Trigonometry
Matrix
Question
x2−2x−12
Find the roots
x1=1−13,x2=1+13
Alternative Form
x1≈−2.605551,x2≈4.605551
Evaluate
x2−2x−12
To find the roots of the expression,set the expression equal to 0
x2−2x−12=0
Substitute a=1,b=−2 and c=−12 into the quadratic formula x=2a−b±b2−4ac
x=22±(−2)2−4(−12)
Simplify the expression
More Steps
Evaluate
(−2)2−4(−12)
Multiply the numbers
More Steps
Evaluate
4(−12)
Multiplying or dividing an odd number of negative terms equals a negative
−4×12
Multiply the numbers
−48
(−2)2−(−48)
Rewrite the expression
22−(−48)
If a negative sign or a subtraction symbol appears outside parentheses, remove the parentheses and change the sign of every term within the parentheses
22+48
Evaluate the power
4+48
Add the numbers
52
x=22±52
Simplify the radical expression
More Steps
Evaluate
52
Write the expression as a product where the root of one of the factors can be evaluated
4×13
Write the number in exponential form with the base of 2
22×13
The root of a product is equal to the product of the roots of each factor
22×13
Reduce the index of the radical and exponent with 2
213
x=22±213
Separate the equation into 2 possible cases
x=22+213x=22−213
Simplify the expression
More Steps
Evaluate
x=22+213
Divide the terms
More Steps
Evaluate
22+213
Rewrite the expression
22(1+13)
Reduce the fraction
1+13
x=1+13
x=1+13x=22−213
Simplify the expression
More Steps
Evaluate
x=22−213
Divide the terms
More Steps
Evaluate
22−213
Rewrite the expression
22(1−13)
Reduce the fraction
1−13
x=1−13
x=1+13x=1−13
Solution
x1=1−13,x2=1+13
Alternative Form
x1≈−2.605551,x2≈4.605551
Show Solution
