Trig Limit Homework Help: Solving (2sinxcosx)/ (2x^2 + x) at x=0

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Homework Help Overview

The discussion revolves around evaluating the limit of the expression (2sinxcosx)/(2x^2 + x) as x approaches 0. The subject area involves trigonometric limits and algebraic manipulation.

Discussion Character

  • Exploratory, Mathematical reasoning, Assumption checking

Approaches and Questions Raised

  • Participants explore rewriting the expression in terms of sin(2x) and discuss factoring the denominator. Questions arise about how to proceed with the limit evaluation and the implications of rewriting the expression.

Discussion Status

There are various interpretations of the limit, with some participants suggesting that the limit approaches 2 while others express uncertainty. Guidance is offered on rewriting the expression, and there is a recognition of the potential to simplify the limit further.

Contextual Notes

Some participants question the assumptions made in the limit evaluation and the steps taken to rewrite the expression. There is a focus on ensuring that the limit is approached correctly without jumping to conclusions.

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Homework Statement



lim x->0 (2sinxcosx)/ (2x^2 + x )

Homework Equations


2sinxcosx = sin(2x)


The Attempt at a Solution


denom. factors to x(2x +1) how to proceed?
 
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jog511 said:

Homework Statement



lim x->0 (2sinxcosx)/ (2x^2 + x )

Homework Equations


2sinxcosx = sin(2x)


The Attempt at a Solution


denom. factors to x(2x +1) how to proceed?

Your expression can be rewritten as ##\frac{\sin(2x)}{2x(x + 1/2)}##. Does that help?
 
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the limit of sin2x/2x will be 2. am I on the right track?
 
sin2x/2x will be 1 I mean
 
can it be written as sin2x/2x * 1/(x + 1/2)
 
jog511 said:
can it be written as sin2x/2x * 1/(x + 1/2)

Yes, that's the idea.
 
I get lim = 2
 
very helpful
 
jog511 said:
I get lim = 2

Yes, but note that you could actually have done it directly:

\lim_{x→0}\frac{2sin(x)cos(x)}{2x^2+x}= 2\lim_{x→0}\frac{sin(x)}{x}cos(x)\frac{1}{2x+1}=2
 
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