Introduction to multiplying rational expressions calculator:
In the algebraic expression the variable does not occur in the fraction or negative index. While using the rational expression calculator the variable that occur in the fractional notation. The calculator show the error mistake. while in the multiply algebraic expression the calculator will be mention in the integer it may not occur any fraction or negative variable.
For example 5x2- 3x +2 this is the algebraic expression
An rational expression of the form A(x) * B(x) where A(x) and B(x) are two polynomials over the set of real numbers and QA(x) ? 0 is called a rational expression.
For example 2/x^2 , ((x^4+x^3+x+1))/((x+5)), are rational expressions.
Rational Expression on Multiplying Rational Expressions Calculator
Problem in rational expression calculator In this expression the variable only in the integer not in the fraction form.
1. Simplify: (x2-x-6)/(x2+5x+6)
= ((x^2-x-6))/((x^2+5x+6))
= ((x-3)(x+2))/((x+2)(x+3))
= ((x-3))/((x+3))
Multiplication of rational expressions
The product of rational expression in the form. The resulting expression is then reduced to its lowest form. If p(x)*g(x)
= (p(x))/(q(x)) + (g(x))/(h(x))
= (g(x))/(h(x)) * (g(x))/(h(x))
In this expression the multiplication in the rational expression are in the status of variable must be in the integers not in the fraction. The multiplication rational expression calculator is reduced to its lowest form.
Problems on Multiplying Rational Expressions Calculator
A rational expression A(x) * B(x) can be reduced to its lowest term by multiplying A(x) and B(x) using calculator method.multiplying the rational term A(x) the expression B(x) in the calculator method the variable x is only in the integer not in the fraction term.
Multiply Rational expression calculation:
2. (x2-2x+ 1) / (x2-3x+2) * (3x-6) / (6x-6)
Solution :
x2 – 2x + 1 = (x–1)2
x2– 3x + 2 = (x – 2) (x – 1);
6x – 6 = 6(x –1)
3x – 6 = 3( x – 2)
((x-1)(x-1))/((x-1)(x-2)) * (6(x-1))/(3(x-2))
2(x-1)^2/((x-2))
3. Simplify (5ab)/(15cd) * (4cb)/(32ad) * (16ac)/(2bc) in the rational expression calculator
Solution (5ab)/(15cd) * (4cb)/(32ad) * (16ac)/(2bc)
= (5*a*b*4*c*b*16*a*c) /(5*3*c*d*2*16*a*d*2*b*c)
= (ab)/(3d^2).
Solution (a^3+b^3)/( a^2+2ab+b^2) *( a2-b2) / (a – b)
=(a+b)(a2-ab+b2) *` ((a+b)(a-b))/((a+b)(a+b)(a-b))
=a2-ab+b2
3. Simplify (x^2-x-6)/(x^2+5x+6)
Solution:
=(x^2-x-6)/(x^2+5x+6)
=(x-3)(x+2) / (x+2)(x+3)
=(x-3)/(x+3)
In the algebraic expression the variable does not occur in the fraction or negative index. While using the rational expression calculator the variable that occur in the fractional notation. The calculator show the error mistake. while in the multiply algebraic expression the calculator will be mention in the integer it may not occur any fraction or negative variable.
For example 5x2- 3x +2 this is the algebraic expression
An rational expression of the form A(x) * B(x) where A(x) and B(x) are two polynomials over the set of real numbers and QA(x) ? 0 is called a rational expression.
For example 2/x^2 , ((x^4+x^3+x+1))/((x+5)), are rational expressions.
Rational Expression on Multiplying Rational Expressions Calculator
Problem in rational expression calculator In this expression the variable only in the integer not in the fraction form.
1. Simplify: (x2-x-6)/(x2+5x+6)
= ((x^2-x-6))/((x^2+5x+6))
= ((x-3)(x+2))/((x+2)(x+3))
= ((x-3))/((x+3))
Multiplication of rational expressions
The product of rational expression in the form. The resulting expression is then reduced to its lowest form. If p(x)*g(x)
= (p(x))/(q(x)) + (g(x))/(h(x))
= (g(x))/(h(x)) * (g(x))/(h(x))
In this expression the multiplication in the rational expression are in the status of variable must be in the integers not in the fraction. The multiplication rational expression calculator is reduced to its lowest form.
Problems on Multiplying Rational Expressions Calculator
A rational expression A(x) * B(x) can be reduced to its lowest term by multiplying A(x) and B(x) using calculator method.multiplying the rational term A(x) the expression B(x) in the calculator method the variable x is only in the integer not in the fraction term.
Multiply Rational expression calculation:
2. (x2-2x+ 1) / (x2-3x+2) * (3x-6) / (6x-6)
Solution :
x2 – 2x + 1 = (x–1)2
x2– 3x + 2 = (x – 2) (x – 1);
6x – 6 = 6(x –1)
3x – 6 = 3( x – 2)
((x-1)(x-1))/((x-1)(x-2)) * (6(x-1))/(3(x-2))
2(x-1)^2/((x-2))
3. Simplify (5ab)/(15cd) * (4cb)/(32ad) * (16ac)/(2bc) in the rational expression calculator
Solution (5ab)/(15cd) * (4cb)/(32ad) * (16ac)/(2bc)
= (5*a*b*4*c*b*16*a*c) /(5*3*c*d*2*16*a*d*2*b*c)
= (ab)/(3d^2).
Solution (a^3+b^3)/( a^2+2ab+b^2) *( a2-b2) / (a – b)
=(a+b)(a2-ab+b2) *` ((a+b)(a-b))/((a+b)(a+b)(a-b))
=a2-ab+b2
3. Simplify (x^2-x-6)/(x^2+5x+6)
Solution:
=(x^2-x-6)/(x^2+5x+6)
=(x-3)(x+2) / (x+2)(x+3)
=(x-3)/(x+3)
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