_+_+_=30
Solve this problem with using (1,3,5,7,9,11,15)
You can repeat this number Don't use other number
Answers
Answer:
Explanation:
Now
we can say that the number we have to prove
To prove:- x+y+z=30
For all x,y,z ∈ 2n+1 where n∈N(Natural numbers).
Proof:-here’s no combination. It’s impossible. Every number in that list is odd.
We know that any even number can be expressed as 2n where n is an integer. Any odd number can be expressed as 2n−1.Now
we can say that the number we have to prove
To prove:- x+y+z=30
For all x,y,z ∈ 2n+1 where n∈N(Natural numbers).
Proof:-here’s no combination. It’s impossible. Every number in that list is odd.
We know that any even number can be expressed as 2n where n is an integer. Any odd number can be expressed as 2n−1.
Answer:
1.5+13.5+15=30
Rotation of 9: 6
6+9+15=30
(15+15)=30
2!+13+15=30
4!+1+5=30
etc………..
Explanation:
Easy Explanation In Puzzle Pedia:
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