Podcast
Questions and Answers
Which operations can the Mixed Numbers Calculator perform?
Which operations can the Mixed Numbers Calculator perform?
- Multiplication and division only
- Addition, subtraction, multiplication, and division (correct)
- Addition and subtraction only
- Addition and multiplication only
What is the formula for adding fractions in the Mixed Numbers Calculator?
What is the formula for adding fractions in the Mixed Numbers Calculator?
- \( \dfrac{a},{b} + \dfrac{c},{d} = \dfrac{(a - c)},{b - d} \)
- \( \dfrac{a},{b} + \dfrac{c},{d} = \dfrac{(a + c)},{b + d} \)
- \( \dfrac{a},{b} + \dfrac{c},{d} = \dfrac{(a \times b) + (c \times d)},{b \times d} \)
- \( \dfrac{a},{b} + \dfrac{c},{d} = \dfrac{(a \times d) + (b \times c)},{b \times d} \) (correct)
What types of numbers can be used in the Mixed Numbers Calculator?
What types of numbers can be used in the Mixed Numbers Calculator?
- Whole numbers and integers only
- Whole numbers, integers, mixed numbers, fractions, and improper fractions (correct)
- Mixed numbers and improper fractions only
- Fractions and improper fractions only
How does the Mixed Numbers Calculator provide the answer?
How does the Mixed Numbers Calculator provide the answer?
What is the format for entering numbers in the Mixed Numbers Calculator?
What is the format for entering numbers in the Mixed Numbers Calculator?
Add 1 2/6 and 2 1/4 using the Adding Fractions Formula: $ \frac{a},{b} + \frac{c},{d} = \frac{(a \times d) + (b \times c)},{b \times d} $
Add 1 2/6 and 2 1/4 using the Adding Fractions Formula: $ \frac{a},{b} + \frac{c},{d} = \frac{(a \times d) + (b \times c)},{b \times d} $
Subtract 5 3/4 from 7 1/2 using the Subtracting Fractions Formula: $ \frac{a},{b} - \frac{c},{d} = \frac{(a \times d) - (b \times c)},{b \times d} $
Subtract 5 3/4 from 7 1/2 using the Subtracting Fractions Formula: $ \frac{a},{b} - \frac{c},{d} = \frac{(a \times d) - (b \times c)},{b \times d} $
Multiply 2 1/3 by 3 1/5 using the Multiplying Fractions Formula: $ \frac{a},{b} \times \frac{c},{d} = \frac{a \times c},{b \times d} $
Multiply 2 1/3 by 3 1/5 using the Multiplying Fractions Formula: $ \frac{a},{b} \times \frac{c},{d} = \frac{a \times c},{b \times d} $
Divide 4 2/3 by 1 1/2 using the Dividing Fractions Formula: $ \frac{a},{b} \div \frac{c},{d} = \frac{a},{b} \times \frac{d},{c} $
Divide 4 2/3 by 1 1/2 using the Dividing Fractions Formula: $ \frac{a},{b} \div \frac{c},{d} = \frac{a},{b} \times \frac{d},{c} $
Simplify the fraction 10/15 to its simplest form using the Simplifying Fractions Formula: $ \frac{a},{b} = \frac{a \div \gcd(a,b)},{b \div \gcd(a,b)} $
Simplify the fraction 10/15 to its simplest form using the Simplifying Fractions Formula: $ \frac{a},{b} = \frac{a \div \gcd(a,b)},{b \div \gcd(a,b)} $
