To find the unit rate, divide the quantity of one item by the quantity of another item, ensuring that the second quantity is set to one. For example, if you have 60 miles driven in 3 hours, you would divide 60 miles by 3 hours to find the rate per hour, resulting in 20 miles per hour. This method can be used with any two related quantities to express the rate per one unit of the second quantity.
you can compare two measurements using ratios to find the unit rate.
To find the unit rate for 2.40 and 3, you divide 2.40 by 3. This gives you a unit rate of 0.80. Thus, the unit rate is 0.80 per unit.
the unit rate of this problem that we need to find our deals with 1
To find the unit rate, divide the price by the number of items. $5.60 / 7 = $0.80. The unit rate is 80 cents.
If you are given a rate of x to y then the equivalent unit rate is x/y to 1.
run 2.3km in 7min find unit rate
you can compare two measurements using ratios to find the unit rate.
To find the unit rate for 2.40 and 3, you divide 2.40 by 3. This gives you a unit rate of 0.80. Thus, the unit rate is 0.80 per unit.
the unit rate of this problem that we need to find our deals with 1
To find the unit rate, divide the price by the number of items. $5.60 / 7 = $0.80. The unit rate is 80 cents.
If you are given a rate of x to y then the equivalent unit rate is x/y to 1.
To find the unit rate of 0.36 of 6, divide 0.36 by 6. This calculation gives you 0.06. Therefore, the unit rate is 0.06.
Division.
The question contains an expression, not an equation. An expression cannot have a unit rate.
the unit rate of this problem that we need to find our deals with 1
No, it is not. 35 to 10 is a unit rate of 3.5 to 1 whereas 7 to 5 is a unit rate of less than 2 to 1.
To find the unit rate, divide the total cost by the number of items. If 10 pencils cost $2.00, the unit rate is $2.00 ÷ 10 pencils = $0.20 per pencil. Therefore, the unit rate is $0.20 per pencil.