Using the Formal Definition

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Question

Using the Formal Definition

Prove the limit statements in Exercises 37–50.

lim x→0 x² sin (1/x) = 0

Accepted Answer

Hello there. Today we're gonna solve the following practice problem together. So, first off, let us read the problem and highlight all the key pieces of information that we need to use in order to solve this problem. Prove the limit statement. The limit as x approaches 0 of x to the power of 3 multiplied by sine of 1 divided by X is equal to 0. Which of the following choices for delta in terms of epsilon correctly prove this limit? Awesome. So it appears for this particular problem we're asked to take our provided limit. And we're trying to figure out which of our multiple choice answers for delta in terms of epsilon correctly prove this limit. So now that we know what we're trying to solve for, let's read off our multiple choice answers to see what our final answer might be, noting that they all state that delta is equal to some expression. So A is 3 epsilon or 3 multiplied by epsilon. B is epsilon to the power of 3, C is epsilon to the power of 1/3, and D is epsilon divided by 3. Awesome. So now, first off, we need to show that for every epsilon is greater than 0, there will exist a delta is greater than 0, such that 0 is less than the absolute value of X, which is less than Delta. Then the absolute value of X to the power of 3 multiplied by sine of 1 divided by X minus 0 is going to be less than epsilon. Fantastic. So now, first off, we need to estimate the function, so we need to notice or recall a note that for all X cannot equal 0. The absolute value of X to the power of 3, multiplied by sine of 1 divided by X. Once again, it's an absolute value signs, is less than or equal to the absolute value of X to the power of 3 in absolute value signs multiplied by the absolute value of of 1 divided by X, once again, noting that they're an absolute value signs. And since, we also need to note that sense, the absolute value of sign of 1 divided by X, is less than or equal to 1 for all X. It will follow that the absolute value of X to the power of 3 multiplied by sin of 1 divided by X in absolute value signs is going to be less than or equal to the absolute value signs of X to the power of 3. So the absolute value of X to the power of 3. So now, Our second step is we need to choose delta in terms of Epsilon. So in order to ensure that the absolute value of X to the power of 3 is less than epsilon, it is sufficient to require that the absolute value of X is less than Delta. So then, as a result, the absolute value of X to the power of 3. is less than delta to the power of 3, which is less than epsilon. So thus, this is satisfied by choosing a value of delta is equal to epsilon to the power of 1/3. So with this choice, whenever 0 is less than the absolute value of X, which is less than epsilon to the power of 1/3, Then the absolute value of X to the power of 3 multiplied by sine of 1 divided by X in absolute value. So the absolute value of X 3 multiplied by sin of 1 divided by X is less than or equal to the absolute value of X to the power of 3. Which is going to be less than epsilon to the power of 1/3 all to the power of 3, which is going to be all equal to epsilon. So therefore, without a doubt, our final answer has to be Delta is equal to epsilon to the power of 1/3, and this corresponds with multiple choice answer letter C, which once again is Delta is equal to epsilon to the power of 13. Thank you so much for watching. Hopefully that helped, and I can't wait to see you in the next video. Bye.

Using the Formal Definition

Prove the limit statements in Exercises 37–50.

lim x→0 x² sin (1/x) = 0

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Key Concepts

Limit Definition

Squeeze Theorem

Behavior of Oscillatory Functions

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