Denominator example sentences

"Denominator" Example Sentences

1. The denominator of the fraction was too large to simplify.
2. I forgot to reduce the denominator before adding the fractions.
3. The lowest common denominator for 3 and 5 is 15.
4. The denominator of the improper fraction was greater than its numerator.
5. We need to find a common denominator to add these fractions.
6. The denominator of this fraction is divisible by 7.
7. The numerator and denominator of this fraction are both odd.
8. The denominator of the decimal represents the place value of the final digit.
9. The denominator of the rational number was negative.
10. The greatest common factor of the numerator and denominator is 6.
11. The improper fraction had a denominator greater than the numerator.
12. The denominator of the mixed number is the whole number part.
13. When simplifying fractions, it's important to cancel out the common factors in the numerator and denominator.
14. The denominator and numerator of the fraction were both multiples of 4.
15. The fraction had a denominator of 10, making it a decimal.
16. The denominator of the complex fraction was a polynomial.
17. I multiplied both the numerator and denominator by 2 to simplify the fraction.
18. The denominator of the equivalent fraction was 20.
19. It is possible to have a fraction with a negative denominator.
20. The numerator was a multiple of 3 while the denominator was a multiple of 5.
21. The common denominator of 2/3 and 5/6 was 6.
22. I had to borrow 1 from the whole number part of the mixed number to reduce the fraction's denominator to 4.
23. The denominator of the equation was a quadratic function.
24. You cannot divide by zero, as the denominator in a fraction must never be zero.
25. The fraction could not be simplified any further, as the numerator and denominator were both prime numbers.
26. The denominator of the rational expression had two factors raised to different powers.
27. When subtracting fractions with different denominators, you must first find the common denominator.
28. The denominator of the improper fraction was greater than the numerator, making it a fraction greater than 1.
29. The denominator of the reduced fraction was a multiple of 3.
30. The denominator of the mixed number was the same as the denominator of the fraction part.

Common Phases

1. Find the common denominator;
2. The denominator is a key factor in this equation;
3. We need to simplify the fraction to get a common denominator;
4. The denominator represents the total number of parts in the whole;
5. The denominator must be the same for all fractions to add or subtract them;
6. The denominator is the bottom number in a fraction;
7. Reduce the fraction by dividing both numerator and denominator by their greatest common factor;
8. Multiply both the numerator and the denominator by the same number to get a common denominator;
9. The lowest common denominator is the smallest number that all denominators will divide into evenly;
10. Remember to include the denominator in the final answer.