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1 DIVIDED BY INFINITE=0
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hey mate here is your answer
No, 1/infinity is not equal to zero. We can say it is approximately zero.
To explain this, let’s consider the general form 1/n.
Here as the value of n increases the value of the fraction 1/n gets closer to zero.
But the thing is, infinity is not a number.
To solve such problems we use limits, which is the concept of calculus.
So we say for limit n tends to infinity, value of 1/n is zero.

No, 1/infinity is not equal to zero. We can say it is approximately zero.
To explain this, let’s consider the general form 1/n.
Here as the value of n increases the value of the fraction 1/n gets closer to zero.
But the thing is, infinity is not a number.
To solve such problems we use limits, which is the concept of calculus.
So we say for limit n tends to infinity, value of 1/n is zero.

subhrajit74:
tq
ok
WHY u gave mad answrr
Answered by
3
heya...
here is ua answer:
Your statement is not right. One devided by infinity is not equal to zero. Here is my view. The limit of a real number devide by X, as X tends to infinity is zero. In fact the “tend” is the key here, it just means X is getting closer to infinity. Why that? Let us work on it with simple talk.
Infinity is very very very big, nobody knows where it stops at. Now, take your number “1” and start deviding it by increasing numbers, you will see that the answers will decrease, getting closer and closer to zero. When the number in the denominator is so big enough, you will see that 1 /X would ge so closed to zero. As we said, we don't know infinity. Thus ,the demonator will keep increasing forever trying to get to infinity, but would never get to it. At some point, the decimal part of the 1/X would be negligible. One would then approximate further division to be equal to zero.
Note that it is still not equal to zero, but very, very closed. It is, In fact, asymptomatic (horizontal y=0).
hope it helps you...!!
here is ua answer:
Your statement is not right. One devided by infinity is not equal to zero. Here is my view. The limit of a real number devide by X, as X tends to infinity is zero. In fact the “tend” is the key here, it just means X is getting closer to infinity. Why that? Let us work on it with simple talk.
Infinity is very very very big, nobody knows where it stops at. Now, take your number “1” and start deviding it by increasing numbers, you will see that the answers will decrease, getting closer and closer to zero. When the number in the denominator is so big enough, you will see that 1 /X would ge so closed to zero. As we said, we don't know infinity. Thus ,the demonator will keep increasing forever trying to get to infinity, but would never get to it. At some point, the decimal part of the 1/X would be negligible. One would then approximate further division to be equal to zero.
Note that it is still not equal to zero, but very, very closed. It is, In fact, asymptomatic (horizontal y=0).
hope it helps you...!!
tq
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