Solution - Factoring binomials using the difference of squares
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Factoring binomials using the difference of squaresStep by Step Solution
Step by step solution :
Step 1 :
Equation at the end of step 1 :
((2•3x25) • x) - 6 = 0Step 2 :
Step 3 :
Pulling out like terms :
3.1 Pull out like factors :
6x26 - 6 = 6 • (x26 - 1)
Trying to factor as a Difference of Squares :
3.2 Factoring: x26 - 1
Theory : A difference of two perfect squares, A2 - B2 can be factored into (A+B) • (A-B)
Proof : (A+B) • (A-B) =
A2 - AB + BA - B2 =
A2 - AB + AB - B2 =
A2 - B2
Note : AB = BA is the commutative property of multiplication.
Note : - AB + AB equals zero and is therefore eliminated from the expression.
Check : 1 is the square of 1
Check : x26 is the square of x13
Factorization is : (x13 + 1) • (x13 - 1)
Equation at the end of step 3 :
6 • (x13 + 1) • (x13 - 1) = 0
Step 4 :
Theory - Roots of a product :
4.1 A product of several terms equals zero.
When a product of two or more terms equals zero, then at least one of the terms must be zero.
We shall now solve each term = 0 separately
In other words, we are going to solve as many equations as there are terms in the product
Any solution of term = 0 solves product = 0 as well.
Equations which are never true :
4.2 Solve : 6 = 0
This equation has no solution.
A a non-zero constant never equals zero.
Solving a Single Variable Equation :
4.3 Solve : x13+1 = 0
Subtract 1 from both sides of the equation :
x13 = -1
x = 13th root of (-1)
Negative numbers have real 13th roots.
13th root of (-1) = 13√ -1• 1 = 13√ -1 • 13√ 1 =(-1)•13√ 1
The equation has one real solution, a negative number This solution is x = negative
Solving a Single Variable Equation :
4.4 Solve : x13-1 = 0
Add 1 to both sides of the equation :
x13 = 1
x = 13th root of (1)
The equation has one real solution
This solution is x =
Two solutions were found :
- x =
- x = negative
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