Algebra
Calculus
Trigonometry
Matrix
Question
Simplify the expression
2x4−4x3
Evaluate
(2x−4)x3
Multiply the terms
x3(2x−4)
Apply the distributive property
x3×2x−x3×4
Multiply the terms
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Evaluate
x3×2x
Use the commutative property to reorder the terms
2x3×x
Multiply the terms
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Evaluate
x3×x
Use the product rule an×am=an+m to simplify the expression
x3+1
Add the numbers
x4
2x4
2x4−x3×4
Solution
2x4−4x3
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Factor the expression
2x3(x−2)
Evaluate
(2x−4)x3
Multiply the terms
x3(2x−4)
Factor the expression
x3×2(x−2)
Solution
2x3(x−2)
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Find the roots
x1=0,x2=2
Evaluate
(2x−4)(x3)
To find the roots of the expression,set the expression equal to 0
(2x−4)(x3)=0
Calculate
(2x−4)x3=0
Multiply the terms
x3(2x−4)=0
Separate the equation into 2 possible cases
x3=02x−4=0
The only way a power can be 0 is when the base equals 0
x=02x−4=0
Solve the equation
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Evaluate
2x−4=0
Move the constant to the right-hand side and change its sign
2x=0+4
Removing 0 doesn't change the value,so remove it from the expression
2x=4
Divide both sides
22x=24
Divide the numbers
x=24
Divide the numbers
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Evaluate
24
Reduce the numbers
12
Calculate
2
x=2
x=0x=2
Solution
x1=0,x2=2
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