Multiplying the common ordinary fractions: 29/45 × 33/43 = ? The multiplication process explained. The result written: As a positive proper fraction (the numerator < the denominator). As a decimal number. As a percentage
29/45 × 33/43 = ?
Simplify the operation
Reduce (simplify) the fractions to their lowest terms equivalents:
To fully reduce a fraction, to the lowest terms equivalent: divide the numerator and denominator by their greatest common factor, GCF.
* By reducing the values of the numerators and the denominators of the fractions the calculations are easier to make.
A fully reduced (simplified) fraction is one with the smallest possible numerator and denominator, one that can no longer be reduced, and it is called an irreducible fraction.
* In order to easily reduce a fraction, factor its numerator and denominator. This way all the common prime factors are easily identified and crossed out, without calculating the GCF.
29/45 is already reduced to the lowest terms.
The numerator and denominator have no common prime factors.
Their prime factorization:
29 is a prime number (it cannot be factored into other prime factors)
45 = 32 × 5
33/43 is already reduced to the lowest terms.
The numerator and denominator have no common prime factors.
Their prime factorization:
33 = 3 × 11
43 is a prime number (it cannot be factored into other prime factors)
Perform the operation of calculating the fractions
Multiply the fractions:
1) Multiply the numerators, that is, all the numbers above the fractions bars, separately.
2) Multiply the denominators, that is, all the numbers below the fractions bars, separately.
* Factor all the numerators and all the denominators in order to easily reduce (simplify) the end fraction.
29/45 × 33/43 =
(29 × 33) / (45 × 43) =
(29 × 3 × 11) / (32 × 5 × 43) =
(3 × 11 × 29) / (32 × 5 × 43)
Fully reduce (simplify) the end fraction to its lowest terms equivalent:
Calculate the greatest common factor, GCF,
of the numerator and denominator of the fraction:
A fully reduced (simplified) fraction is one with the smallest possible numerator and denominator, one that can no longer be reduced, and it is called an irreducible fraction.
To fully reduce a fraction, to the lowest terms equivalent: divide the numerator and denominator by their greatest common factor, GCF.
* To calculate the GCF, we need to factor the numerator and the denominator of the fraction into prime factors.
Then multiply all the common prime factors: if there are repeating prime factors we only take them once, and only the ones having the lowest exponent (the lowest powers).
GCF (3 × 11 × 29; 32 × 5 × 43) = 3
Divide the numerator and the denominator by their GCF:
(3 × 11 × 29) / (32 × 5 × 43) =
((3 × 11 × 29) ÷ 3) / ((32 × 5 × 43) ÷ 3) =
(3 ÷ 3 × 11 × 29)/(32 ÷ 3 × 5 × 43) =
(1 × 11 × 29)/(3(2 - 1) × 5 × 43) =
(1 × 11 × 29)/(31 × 5 × 43) =
(1 × 11 × 29)/(3 × 5 × 43) =
(11 × 29)/(3 × 5 × 43) =
319/645
Rewrite the fraction
As a decimal number:
Simply divide the numerator by the denominator, without a remainder, as shown below:
319/645 =
319 ÷ 645 ≈
0.494573643411 ≈
0.49
As a percentage:
A percentage value p% is equal to the fraction: p/100, for any decimal number p. So, we need to change the form of the number calculated above, to show a denominator of 100.
To do that, multiply the number by the fraction 100/100.
The value of the fraction 100/100 = 1, so by multiplying the number by this fraction the result is not changing, only the form.
0.494573643411 =
0.494573643411 × 100/100 =
(0.494573643411 × 100)/100 =
49.457364341085/100 ≈
49.457364341085% ≈
49.46%
The final answer:
written in three ways
As a positive proper fraction:
(the numerator < the denominator)
29/45 × 33/43 = 319/645
As a decimal number:
29/45 × 33/43 ≈ 0.49
As a percentage:
29/45 × 33/43 ≈ 49.46%
How are the numbers being written on our website: comma ',' is used as a thousands separator; point '.' used as a decimal separator; numbers rounded off to max. 12 decimals (if the case). The set of the used symbols on our website: '/' the fraction bar; ÷ dividing; × multiplying; + plus (adding); - minus (subtracting); = equal; ≈ approximately equal.
Other similar operations
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