Dividing Fractions Over Fractions
Dividing Fractions Over Fractions. Use exponents for repeated factors. This is what your final answer should look like:
This is what your final answer should look like: Fraction is already as simple as possible, so no need for step 2. 5 1 becomes 1 5.
Be Sure To Use The * Between Different Factors.
Multiply the numerators together and multiply the denominators together. Multiplying both numerator and denominator by 10 for every number after the decimal. Learn how to divide a fraction by a fraction with mr.
This Is Now A Reciprocal.
Multiply the numerators of the fractions; Enter mixed numbers with space. Enter simple fractions with slash (/).
This Is What Your Final Answer Should Look Like:
Turn over) the denominator fraction and multiply the fractions; To divide one fraction by another fraction, change the problem to multiplication: Multiply the numerators and denominators of both fractions.
Enter Fractions And Press The = Button.
Since we're dividing by a whole number, just divide the numerator by the whole number, and leave the denominator alone: Cancel the 21 and 7 by dividing them both by 7 \[= \frac{{3 \times 5}}{{4 \times 1}}\] multiply the numerators and multiply the denominators \[= \frac{{15}}{4}\] change back into a mixed number Turn any whole numbers into fractions over 1.
In This Case, 8 Goes Into 9 Once, With A Remainder Of One.
9/4 ÷ 3 = 3/4, your final answer. Multiply the numerators of the fractions; 2 3 × 1 5 = 2 × 1 3 × 5 = 2 15.