limx→∞(xsin2πx2+1)

brovaddallaunnei-4603

brovaddallaunnei-4603

Answered question

2022-07-11

limx(xsin2πx2+1)

Answer & Explanation

nick1337

nick1337

Expert2023-05-28Added 777 answers

To evaluate the limit limx(xsin(2πx2+1)), we can use some properties of limits and trigonometric functions.
As x approaches infinity, the term x2+1 can be approximated as x since the x2 term dominates as x grows large.
Therefore, we can rewrite the expression as:
limx(xsin(2πx2+1))=limx(xsin(2πx))
Since sin(2πx) is a periodic function with a period of 2π, the value of sin(2πx) oscillates between -1 and 1 as x increases without bound.
As a result, the expression xsin(2πx) does not converge to a specific value as x approaches infinity. Instead, it oscillates between negative and positive infinity.
Therefore, the limit is not defined.

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