Αποτελέσματα Αναζήτησης
For 1/8 divided by 1/4, you could change the problem to 1/8 divided by 2/8, or "How much of 2/8 fit into 1/8?" The answer would be "Half [of 2/8 fits into 1/8." This is pretty much how you could think about dividing across for this problem, too.
This video will demonstrate how to divide a fraction by a fraction using a Tape Diagram.
Lesson 4 Concept Development. Problem 1. Eight tons of gravel is equally divided between 4 dump trucks. How much gravel is in one dump truck? Problem 2. Five tons of gravel is equally divided between 4 dump trucks. How much gravel is in one dump truck? Problem 3. A 3 meter ribbon is cut into 4 equal pieces to make flowers.
Type any fraction into the fraction visualizer below, and the visualizer will draw a picture of the fraction as filled circles -- filled pizzas to help you visualize the concept of the fraction you typed.
Understanding division of fractions. Dividing fractions can be understood using number lines and jumps. To divide a fraction like 8/3 by another fraction like 1/3, count the jumps of 1/3 needed to reach 8/3. Alternatively, multiply 8/3 by the reciprocal of the divisor (3/1) to get the same result.
There are 3 Simple Steps to Divide Fractions: Step 1. Turn the second fraction (the one you want to divide by) upside down. (this is now a reciprocal ). Step 2. Multiply the first fraction by that reciprocal. Step 3. Simplify the fraction (if needed) Example: 1 2 ÷ 1 6. Step 1. Turn the second fraction upside down (it becomes a reciprocal ):
“This time, divide 3/4 by 1/8. Let’s place as many 1/8 strips as we can to match the 3/4 strip.” Model it and then walk around to help students who may need support.
