hi !
Challenge to Brainly experts ..
prove that
2 + 2 = 5.
Give easy way ..
Accept my challenge.
Answers
Answered by
120
Hey there !
_____________________________
Given : 2 + 2 = 4 .............(1)
To prove : 2 + 2 = 5
Proof :
We can say that..
20 - 20 = 25 - 25
[Because both equals to 0]
20 - 20 = 25 - 25
5 × 4 - 5 × 4 = 5 × 5 - 5 × 5
4 ( 5 - 5 ) = 5 ( 5 - 5)
On cancelling [ 5 - 5 ] both sides..
∴ 4 = 5
Now,
As we have proved above : 4 = 5
We can substitute value in equation (1)
2 + 2 = 4 [ Given ]
=> 2 + 2 = 5 [ 4 = 5 ]
Hence,
It is proved that 2 + 2 = 5
__________________________
Now, coming to the mistakes that we have done above, because it is universal truth that
[ 2 + 2 = 4 ]
So, in the above solution we can't cancel 5 - 5 both sides because both the sides , there are different numbers multiplied.
__________________________
Hope you are satisfied.
Thanks for the question !
BrainlyQueen01:
thanks to everyone ..☺♥
Answered by
48
=> It is just a contradiction not reality !!
As , we know
When we multiply any value with 0 , the product will also be 0 .
And we know that ,
5 = 1+4 , 2+3 (We can take any value)
Here,
we have to prove ,
2+2 = 5
Proof :
(I am taking 4 and 1)
2×0+2×0 = 4×0+1×0 (Equals are always equal to each other)
Taking 0 common ,
0(2+2) = 0(4+1)
0 to be cancelled with 0 ,
2+2 = 4+1
2+2 = 5 .
Well , it is not possible because 2+2 = 4 is a permanent truth .
But still we have proved .
#Hence Proved!!
Read more on Brainly.in - https://brainly.in/question/5943659#readmore
=> I know it is copied from my own Answer .
The link is above. I am having it's copyright.
Thanks !!
#Be Brainly!!
As , we know
When we multiply any value with 0 , the product will also be 0 .
And we know that ,
5 = 1+4 , 2+3 (We can take any value)
Here,
we have to prove ,
2+2 = 5
Proof :
(I am taking 4 and 1)
2×0+2×0 = 4×0+1×0 (Equals are always equal to each other)
Taking 0 common ,
0(2+2) = 0(4+1)
0 to be cancelled with 0 ,
2+2 = 4+1
2+2 = 5 .
Well , it is not possible because 2+2 = 4 is a permanent truth .
But still we have proved .
#Hence Proved!!
Read more on Brainly.in - https://brainly.in/question/5943659#readmore
=> I know it is copied from my own Answer .
The link is above. I am having it's copyright.
Thanks !!
#Be Brainly!!
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