**How do you solve distance equals rate times time? Yahoo**

Distance = Rate * Time The general idea with Same Direction — or “Catch Up” — motion questions is that you have two entities moving in the same direction at different rates of speed. One entity usually starts after the other entity and travels at a faster rate of speed to “catch up” with the first entity.... 13/11/2011 · Best Answer: I'm doing this is algebra right now! It is tricky I agree, ok well if there are 2 people in the problem, make a chart, the first person on the top, 2nd person on the bottom. Look for the 1st person's rate, and next to their name, right their rate. Then if the second persons rate …

**Distance Time & Average Speed Practice Problems Video**

21/05/2014 · Thus, summing the individual times spent driving and flying and equating it to the total time, we can solve for 'x'. Time(1) + Time(2) = Time(3) --> (150 - x)/30 + x/60 = 3 --> x = 120 miles Answer : 120 miles Note: In this problem, we did not calculate average speed for row 3 since we did not need it. Remember not to waste time in useless calculations! Example 3. A passenger train leaves the... Distance = Rate * Time The general idea with Same Direction — or “Catch Up” — motion questions is that you have two entities moving in the same direction at different rates of speed. One entity usually starts after the other entity and travels at a faster rate of speed to “catch up” with the first entity.

**Distance Time & Average Speed Practice Problems Video**

Okay so our rate of biking is x, our time of biking is 1.5, our rate of driving is x+40 and our time driving is 0.5. So from here we've turned our word problem into a table into a linear equation we can then solve. toothless how to train your dragon coloring pages In this lesson, we'll practice figuring out just how much time we're talking about as we solve problems involving time. Let's Work Together Many hands make light work.

**How do you solve distance equals rate times time? Yahoo**

Example 4 ?? Alma drove to the mountains last weekend. There was heavy traffic on the way there, and the trip took 9 hours. When Alma drove home, there was no traffic and the trip only took 4 hours. how to stop dwelling on problems Okay so our rate of biking is x, our time of biking is 1.5, our rate of driving is x+40 and our time driving is 0.5. So from here we've turned our word problem into a table into a linear equation we can then solve.

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### How do you solve distance equals rate times time? Yahoo

- How do you solve distance equals rate times time? Yahoo
- How do you solve distance equals rate times time? Yahoo
- How do you solve distance equals rate times time? Yahoo
- How do you solve distance equals rate times time? Yahoo

## How To Solve A Distance Rate Time Problem

Distance = Rate * Time The general idea with Same Direction — or “Catch Up” — motion questions is that you have two entities moving in the same direction at different rates of speed. One entity usually starts after the other entity and travels at a faster rate of speed to “catch up” with the first entity.

- To solve this problem, we'll use the distance formula: Distance = Rate x Time. Since an equation remains true as long as we perform the same operation on both sides, we can divide both sides by rate: Distance----- = Time Rate. or by time: Distance----- = Rate Time. So rate is defined as distance divided by time, which is a ratio. Speed is another word that is used for rate. When a problem says
- When dealing with distance, rate and time, we always want to remember the nifty little formula, D = R x T, in which D stands for the distance, R stands for the rate (or speed), and T stands for the time. With the problem above, the distance between Berkeley and Los Angeles is 350 miles. So D = 350. Bob is traveling at 50 mph, so that is his rate. The question is how long will it take him to
- When dealing with distance, rate and time, we always want to remember the nifty little formula, D = R x T, in which D stands for the distance, R stands for the rate (or speed), and T stands for the time. With the problem above, the distance between Berkeley and Los Angeles is 350 miles. So D = 350. Bob is traveling at 50 mph, so that is his rate. The question is how long will it take him to
- Distance = Rate * Time The general idea with Same Direction — or “Catch Up” — motion questions is that you have two entities moving in the same direction at different rates of speed. One entity usually starts after the other entity and travels at a faster rate of speed to “catch up” with the first entity.