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2. Estimating a limit graphically. Activate Use a graph to estimate the limit \lim_{\theta \to 0} \frac{\sin(6\theta)}{\theta} Note: $\theta$ is measured in radians. All angles will be in radians in this class unless otherwise specified. \lim_{\theta \to 0} \frac{\sin(6\theta)}{\theta} = 

          2. Estimating a limit graphically.
Activate
Use a graph to estimate the limit
\lim_{\theta \to 0} \frac{\sin(6\theta)}{\theta}
Note: $\theta$ is measured in radians. All angles will be in radians in this class
unless otherwise specified.
\lim_{\theta \to 0} \frac{\sin(6\theta)}{\theta} =
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2. Estimating a limit graphically. Activate Use a graph to estimate the limit limθ→0 (sin(6θ))/(θ) Note: θ is measured in radians. All angles will be in radians in this class unless otherwise specified. limθ→0 (sin(6θ))/(θ) =

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Precalculus with Limits
Precalculus with Limits
Ron Larson 2nd Edition
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Estimating a limit graphically. Activate Use a graph to estimate the limit lim_( heta ->0)(sin(6 heta ))/( heta ) Note: heta is measured in radians. All angles will be in radians in this class unless otherwise specified. lim_( heta ->0)(sin(6 heta ))/( heta )= 2. Estimating a limit graphically Activate Use a graph to estimate the limit sin(60) lim 00 Note: is measured in radians. All angles will be in radians in this class unless otherwise specified. d lim sin(60) 9-0
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00:01 We have to use the graph to estimate the limit, use radiance unless degree are indicated by theta.
00:09 So the limit is given, theta tends to 0, sine 2 theta upon theta, sine to theta upon theta.
00:24 This is the limit.
00:29 So we will make the graph of sine to theta upon theta...
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