How many different values can be formed by using only four 50-cent coins, four 1-dollar coins, four 2-dollar coins and four 5-dollar coins?
Please help me to solve this oneš
I ran across this one the other day. See what you can make of it.
Find the integral of
ecosx(sinx-(sinx+cosx)esinx+cosx)
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esin2x-2esinx+1
I ran across this one the other day. See what you can make of it.
Find the integral of
ecosxsinx-(sinx+cosx)esinx+cosx
--------------------------------------------------------------------
esin2x-2esinx+1
I ran across this one the other day. See what you can make of it.
Find the integral of
ecosxsinx-(sinx+cosx)esinx+cosx
----------------------------------------------
esin2x-2esinx+1
I ran across this one the other day. See what you can make of it.
Find the integral of
ecosxsinx - (sinx+cosx)esinx+cosx
-----------------------------------------
esin2x-2esinx+1
To find the number of different values that can be formed using the given coins, we can use a combination of coins approach.
Let's break it down step by step:
1. Start by considering the 50-cent coins. Since there are four of them, you can have any combination of 0, 1, 2, 3, or 4 coins.
2. Next, move on to the 1-dollar coins. Again, there are four of them, so you can have any combination of 0, 1, 2, 3, or 4 coins.
3. Proceed similarly with the 2-dollar coins, allowing for any combination of 0, 1, 2, 3, or 4 coins.
4. Lastly, consider the 5-dollar coins. With four of them, you can have any combination of 0, 1, 2, 3, or 4 coins.
Now, multiply the number of possibilities for each type of coin:
- For the 50-cent coins, you have 5 (0-4 options).
- For the 1-dollar coins, you have 5 (0-4 options).
- For the 2-dollar coins, you have 5 (0-4 options).
- For the 5-dollar coins, you have 5 (0-4 options).
Multiply these values together:
5 * 5 * 5 * 5 = 625.
So, there are 625 different values that can be formed using the given coins.