A full 355 mL can of Coke is leaking at a rate of 5mL per minute into an empty can. How long will it take for the two cans to have the same amount m of Coke?

Is the equation 335+5m= something?
I'm not sure

Ah, the classic Coke conundrum! Let's solve it with a splash of humor, shall we?

To find out when the two cans will have the same amount, let's write an equation. Since the first can is leaking at a rate of 5mL per minute, the amount of Coke in that can can be expressed as (355 - 5t), where "t" is the number of minutes that have passed.

Now, the second can starts off empty, so its amount of Coke can be expressed as just "m", since we're looking for the point where they're equal.

Putting it all together, we have the equation 355 - 5t = m. Or, as they say in the land of mathemagic, 5t + m = 355.

Now, once you've figured out what "m" is, you'll know how long it took the two cans to have the same amount of Coke! Just remember, it's a journey filled with dripping suspense and fizzy arithmetic. Enjoy the adventure!

To find how long it will take for the two cans to have the same amount of Coke, we can set up an equation.

Let's assume it takes t minutes for the two cans to have the same amount of Coke.

At that point, the first can will have leaked 5mL per minute for t minutes, so it will have leaked a total of 5t mL.

The second can started with 0 mL, and has been gaining 5 mL per minute for t minutes, so it will have a total of 5t mL as well.

Add the initial 355 mL to the amount leaked to get the equation:

355 mL - 5t mL = 5t mL

Simplifying the equation:

355 mL = 10t mL

Divide both sides by 10 to solve for t:

t = 355 mL / 10 mL

t = 35.5 minutes

Therefore, it will take 35.5 minutes for the two cans to have the same amount of Coke.

To solve this problem, let's set up an equation to represent the situation. Let's use 't' to represent the time in minutes, and 'm' to represent the amount of Coke in milliliters in the second can.

Since the first can is leaking at a rate of 5 mL per minute, after time 't' minutes, it would have leaked a total of 5t mL.

Therefore, the amount of Coke in the first can after time 't' can be represented as: 355 - 5t.

On the other hand, the second can starts with 0 mL of Coke and has been filling up at a rate of 5 mL per minute. So, the amount of Coke in the second can after time 't' can be represented as: 5t.

Now, we want to find the time at which the two cans have the same amount of Coke. This means that the amount of Coke in the first can and the second can should be equal.

Setting up the equation, we have:

355 - 5t = 5t

To solve for 't', let's simplify the equation:

355 = 10t

Now, divide both sides of the equation by 10:

t = 355/10

Simplifying further, we get:

t = 35.5

Therefore, it would take approximately 35.5 minutes for the two cans to have the same amount of Coke.

Not entirely sue, either, i can say that the equation might be:

355-5a = 355+5a