add :-
14\frac{1}{2} + 18\frac{3}{4} + 11\frac{2}{3}
the right answer is 44\frac{11}{12}[/tex]
please answer in steps
Answers
Answer:
Step-by-step explanation:
We have studied procedures for working with fractions in earlier grades.
ab×cd=acbd(b≠0;d≠0)
ab+cb=a+cb(b≠0)
ab÷cd=ab×dc=adbc(b≠0;c≠0;d≠0)
Note: dividing by a fraction is the same as multiplying by the reciprocal of the fraction.
In some cases of simplifying an algebraic expression, the expression will be a fraction. For example,
x2+3xx+3
has a quadratic binomial in the numerator and a linear binomial in the denominator. We have to apply the different factorisation methods in order to factorise the numerator and the denominator before we can simplify the expression.
x2+3xx+3=x(x+3)x+3=x(x≠−3)
If x=−3 then the denominator, x+3=0 and the fraction is undefined. WORKED EXAMPLE 18: SIMPLIFYING FRACTIONS
Simplify:
ax−b+x−abax2−abx,(x≠0;x≠b)
Use grouping to factorise the numerator and take out the common factor ax in the denominator
(ax−ab)+(x−b)ax2−abx=a(x−b)+(x−b)ax(x−b)
Take out common factor (x−b) in the numerator
=(x−b)(a+1)ax(x−b)
Cancel the common factor in the numerator and the denominator to give the final answer
=a+1ax
WORKED EXAMPLE 19: SIMPLIFYING FRACTIONS
Simplify:
x2−x−2x2−4÷x2+xx2+2x,(x≠0;x≠±2)
Factorise the numerator and denominator
=(x+1)(x−2)(x+2)(x−2)÷x(x+1)x(x+2)
Change the division sign and multiply by the reciprocal
=(x+1)(x−2)(x+2)(x−2)×x(x+2)x(x+1)
Write the final answer
=1
WORKED EXAMPLE 20: SIMPLIFYING FRACTIONS
Simplify:
x−2x2−4+x2x−2−x3+x−4x2−4,(x≠±2)
Factorise the denominators
x−2(x+2)(x−2)+x2x−2−x3+x−4(x+2)(x−2)
Make all denominators the same so that we can add or subtract the fractions
The lowest common denominator is (x−2)(x+2).
x−2(x+2)(x−2)+(x2)(x+2)(x+2)(x−2)−x3+x−4(x+2)(x−2)
Write as one fraction
x−2+(x2)(x+2)−(x3+x−4)(x+2)(x−2)
Simplify
x−2+x3+2x2−x3−x+4(x+2)(x−2)=2x2+2(x+2)(x−2)
Take out the common factor and write the final answer
2(x2+1)(x+2)(x−2)
WORKED EXAMPLE 21: SIMPLIFYING FRACTIONS
Simplify:
2x2−x+x2+x+1x3−1−xx2−1,(x≠0;x≠±1)
Factorise the numerator and denominator
2x(x−1)+(x2+x+1)(x−1)(x2+x+1)−x(x−1)(x+1)
Simplify and find the common denominator
2(x+1)+x(x+1)−x2x(x−1)(x+1)
Write the final answer
2x+2+x2+x−x2x(x−1)(x+1)=3x+2x(x−1)(x+1)