Question

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•If I cut a cake into 3 pieces then each piece will be 0.3333th part of the cake. So, where is the 0.0001th part of the cake?

•No irrelevant answers
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Answer 1

Answer:

This answer somehow will be irrelevant to Non Mathematicians.

Step-by-step explanation:

See,

• 1/3 is equal to 0.3333333......... (an irrational number) and not 0.3333
• We can't subtract an irrational number from a rational one, without using the approximate value of the irrational number.

For example,

Subtract PI from 4.

This is not possible untill I take Pi to be equal to 3.14 or some exact value.

REMEMBER PI IS EQUAL TO THIS:-

3. 14159265358979323846264 338327950 288419739937510 5820974944 5923078164 06286208625........

So tell me, how can you say that 4 - PI = 0. 86, without taking the actual value?

And remember, 0.4 - 0.333333333333........ is infinitely small, approaching to 0.

So I would not say that you will get the 0.0001 th part.

- Harsh Sharma

Answer 2

Question:-

➡ If I cut a cake into 3 pieces then each piece will be 0.3333th part of the cake. So, where is the 0.0001th part of the cake?

Answer:-

➡ The 0.0001th part of the cake is left in the knife and in the plate where the cake is present.

This is a nice question.

If we cut the cake into 3pieces then each piece will be 0.3333th part of the cake. Total there will be 0.9999th part of the cake.

But a question arises that where is the 0.0001th (1-0.9999) part of the cake. Well, we may notice that few part of the cake is left behind in the knife and also in the plate which is the required answer for the question.