Question

6x-18÷x^2-4 × (x+3)(x+2÷x^2-9​

Answer 1

-2 • (2x4 - 15x3 - 54x2 + 4x + 21)

——————————————————————————————————

x2

Step by step solution :

Step 1 :

2

Simplify ——

x2

Equation at the end of step 1 :

18 2

(6x-————)-((4•(x+3))•((x+——)-9))

(x2) x2

Step 2 :

Rewriting the whole as an Equivalent Fraction :

2.1 Adding a fraction to a whole

Rewrite the whole as a fraction using x2 as the denominator :

x x • x2

x = — = ——————

1 x2

Equivalent fraction : The fraction thus generated looks different but has the same value as the whole

Common denominator : The equivalent fraction and the other fraction involved in the calculation share the same denominator

Adding fractions that have a common denominator :

2.2 Adding up the two equivalent fractions

Add the two equivalent fractions which now have a common denominator

Combine the numerators together, put the sum or difference over the common denominator then reduce to lowest terms if possible:

x • x2 + 2 x3 + 2

—————————— = ——————

x2 x2

Equation at the end of step 2 :

18 (x3+2)

(6x-————)-((4•(x+3))•(——————-9))

(x2) x2

Step 3 :

Rewriting the whole as an Equivalent Fraction :

3.1 Subtracting a whole from a fraction

Rewrite the whole as a fraction using x2 as the denominator :

9 9 • x2

9 = — = ——————

1 x2

Trying to factor as a Sum of Cubes :

3.2 Factoring: x3 + 2

Theory : A sum of two perfect cubes, a3 + b3 can be factored into :

(a+b) • (a2-ab+b2)

Proof : (a+b) • (a2-ab+b2) =

a3-a2b+ab2+ba2-b2a+b3 =

a3+(a2b-ba2)+(ab2-b2a)+b3=

a3+0+0+b3=

a3+b3

Check : 2 is not a cube !!

Ruling : Binomial can not be factored as the difference of two perfect cubes

3.3 Find roots (zeroes) of : F(x) = x3 + 2

Polynomial Roots Calculator is a set of methods aimed at finding values of x for which F(x)=0

Rational Roots Test is one of the above mentioned tools. It would only find Rational Roots that is numbers x which can be expressed as the quotient of two integers

The Rational Root Theorem states that if a polynomial zeroes for a rational number P/Q then P is a factor of the Trailing Constant and Q is a factor of the Leading Coefficient

In this case, the Leading Coefficient is 1 and the Trailing Constant is 2.

The factor(s) are:

of the Leading Coefficient : 1

of the Trailing Constant : 1 ,2

Let us test ....

P Q P/Q F(P/Q) Divisor

-1 1 -1.00 1.00

-2 1 -2.00 -6.00

1 1 1.00 3.00

2 1 2.00 10.00

Adding fractions that have a common denominator :

3.4 Adding up the two equivalent fractions

(x3+2) - (9 • x2) x3 - 9x2 + 2

————————————————— = ————————————

x2 x2

Equation at the end of step 3 :

18 (x3-9x2+2)

(6x-————)-((4•(x+3))•——————————)

(x2) x2

Step 4 :

Equation at the end of step 4 :

18 (x3-9x2+2)

(6x-————)-(4•(x+3)•——————————)

(x2) x2

Step 5 :

5.1 Find roots (zeroes) of : F(x) = x3-9x2+2

See theory in step 3.3

In this case, the Leading Coefficient is 1 and the Trailing Constant is 2.

The factor(s) are:

of the Leading Coefficient : 1

of the Trailing Constant : 1 ,2

Let us test ....

P Q P/Q F(P/Q) Divisor

-1 1 -1.00 -8.00

-2 1 -2.00 -42.00

1 1 1.00 -6.00

2 1 2.00 -26.00

Equation at the end of step 5 :

18 4•(x+3)•(x3-9x2+2)

(6x-————)-——————————————————

(x2) x2

Step 6 :

18

Simplify ——

x2

Equation at the end of step 6 :

18 4 • (x + 3) • (x3 - 9x2 + 2)

(6x - ——) - ————————————————————————————

x2 x2

Step 7 :

Rewriting the whole as an Equivalent Fraction :

7.1 Subtracting a fraction from a whole

Rewrite the whole as a fraction using x2 as the denominator :

6x 6x • x2

6x = —— = ———————

1 x2

Adding fractions that have a common denominator :

7.2 Adding up the two equivalent fractions

6x • x2 - (18) 6x3 - 18

—————————————— = ————————

x2 x2

Equation at the end of step 7 :

(6x3 - 18) 4 • (x + 3) • (x3 - 9x2 + 2)

—————————— - ————————————————————————————

x2 x2

Step 8 :

Step 9 :

Pulling out like terms :

9.1 Pull out like factors :

6x3 - 18 = 6 • (x3 - 3)

Trying to factor as a Difference of Cubes:

9.2 Factoring: x3 - 3

Theory : A difference of two perfect cubes, a3 - b3 can be factored into

(a-b) • (a2 +ab +b2)

Proof : (a-b)•(a2+ab+b2) =

a3+a2b+ab2-ba2-b2a-b3 =

a3+(a2b-ba2)+(ab2-b2a)-b3 =

a3+0+0+b3 =

a3+b3

Check : 3 is not a cube !!

9.3 Find roots (zeroes) of : F(x) = x3 - 3

See theory in step 3.3

In this case, the Leading Coefficient is 1 and the Trailing Constant is -3.

The factor(s) are:

of the Leading Coefficient : 1

of the Trailing Constant : 1 ,3

Let us test ....

P Q P/Q F(P/Q) Divisor

-1 1 -1.00 -4.00

-3 1 -3.00 -30.00

1 1 1.00 -2.00

3 1 3.00 24.00

Adding fractions which have a common denominator :

9.4 Adding fractions which have a common denominator

Combine the numerators together, put the sum or difference over the common denominator then reduce to lowest terms if possible:

6 • (x3-3) - (4 • (x+3) • (x3-9x2+2)) -4x4 + 30x3 + 108x2 - 8x - 42

————————————————————————————————————— = —————————————————————————————

x2 x2

Step 10 :

Pulling out like terms :

10.1 Pull out like factors :

-4x4 + 30x3 + 108x2 - 8x - 42 =

-2 • (2x4 - 15x3 - 54x2 + 4x + 21)