Rate Problems With Fractions

Grade 7 Math Worksheets

Rate is a measure of the quantity of something in relation to another quantity, typically expressed as a ratio, fraction, or percentage. It represents how one quantity changes with respect to another quantity.

In general, the rate can be defined as the amount of change in one quantity with respect to another quantity, often over a specific unit of time or other standard unit of measurement.

Rate problems involve calculating quantities such as speed, distance, time, or work done based on given rates. These problems often involve the relationship between two or more quantities, typically expressed as a rate or ratio.

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Rate Problems With Fractions - Grade 7 Math Worksheet PDF

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Example Questions

1. A water tank can be filled by Pipe A in 3/4 of an hour and by Pipe B in 5/6 of an hour. If both pipes are opened simultaneously, how long will it take to fill the tank?

Solution

Let t be the time it takes to fill the tank when both pipes are opened simultaneously.

The rates at which Pipe A and Pipe B fill the tank are 1/(3/4) = 4/3 tanks per hour and 1/(5/6) = 6/5 tanks per hour respectively.

When both pipes are opened simultaneously, their combined rate is the sum of their individual rates:

Combined Rate = 4/3 + 6/5 = 20/15 + 18/15 = 38/15

Now, we can set up the equation:

38/15 x t = 1

=> t = 1 x 15/38 = 15/38 hours

2. A car travels at a speed of 3/4 of a mile per minute. How far will it travel in 5/6 of an hour?

Solution

First, we need to convert 5/6 of an hour into minutes since the speed is given in miles per minute.

Given that there are 60 minutes in an hour:

5/6 of an hour = 5/6 x 60 = 50 minutes

The distance the car travels is given by the rate multiplied by the time:

Distance = speed x time

Given that the speed is 3/4 of a mile per minute, and the time is 50 minutes, we have:

Distance = 3/4 x 50 = 150/4 = 37.5 miles in 5/6 of an hour.

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3. A faucet can fill a bathtub in 3/8 of an hour. If the faucet is left running, how much of the bathtub will be filled in 1/4 of an hour?

Solution

The portion of the bathtub filled in 1/4 of an hour is given by the rate multiplied by the time:

Portion filled = 1/4 x 3/8 = 3/32 of the bathtub

So, 3/32 of the bathtub will be filled in 1/4 of an hour

4. A train travels at a speed of 3/5 of a mile per minute. How long will it take the train to travel a distance of 4/3 miles, in hours?

Solution

Distance = Speed x time

=> Time = Distance/Speed

= (4/3)/(3/5)

= 4/3 x 5/3

= 20/9

So, the time taken by the train to travel a distance of 4/3 miles is 20/9 minutes = (20/9)/60 hours = 1/27 hours

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Rate Problems With Fractions FAQS

What are rate problems?

Rate problems involve quantities that change over time or other units of measurement. Rates are typically expressed as a ratio of one quantity to another, such as miles per hour, dollars per hour, or items per minute.

How do you calculate rate?

The rate is calculated by dividing one quantity by another. For example, to calculate the rate of miles per hour, divide the distance traveled by the time it takes to travel that distance.

What are some common types of rate problems?

Common types of rate problems include problems involving distance, time, speed, work, flow rates, conversion between units, and comparison of rates.

How do you solve rate problems involving distance, time, and speed?

In distance, time, and speed problems, use the formula speed = distance/time to find the speed, and use the relationship distance = speed x time to find missing distances or times.

What are work rate problems?

Work rate problems involve calculating the amount of work done by multiple workers or machines working together. The rate of work is typically expressed as the amount of work done per unit of time.

How do you solve work rate problems?

In work rate problems, determine the combined rate at which all workers or machines work together, then use the relationship work = rate x time to find the total amount of work done over a given time period.

What are flow rate problems?

Flow rate problems involve calculating the rate at which a liquid or material flows through a system. Flow rates are typically expressed as volumes per unit of time.

How do you solve flow rate problems?

In flow rate problems, use the formula flow rate = volume/time to calculate the flow rate, and use the relationship volume = rate x time to find missing volumes or times.

What are some strategies for solving rate problems?

Some strategies for solving rate problems include setting up equations based on the given information, identifying the relationship between quantities, using unit conversion when necessary, and checking solutions for reasonableness.

What are some real-life applications of rate problems?

Rate problems have various real-life applications such as calculating travel times and distances, determining production rates in manufacturing, managing workflow in business operations, and analyzing fluid dynamics in engineering.

Gloria Mathew writes on math topics for K-12. A trained writer and communicator, she makes math accessible and understandable to students at all levels. Her ability to explain complex math concepts with easy to understand examples helps students master math. LinkedIn

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