lim theta->0 1 – cos(theta) / theta = ___________________
0
To evaluate the limit:
lim theta->0 (1 – cos(theta)) / theta
We can use L’Hopital’s rule or trigonometric identities:
Method 1: L’Hopital’s Rule
Since we have the indeterminate form 0/0, we can use L’Hopital’s rule to evaluate the limit by taking the derivative of the numerator and denominator with respect to theta:
lim theta->0 (1 – cos(theta)) / theta
= lim theta->0 sin(theta) / 1 (using L’Hopital’s rule)
= sin(0) / 1
= 0 / 1
= 0
Therefore, the limit is 0.
Method 2: Trigonometric Identities
We can rewrite the expression as:
lim theta->0 (1 – cos(theta)) /theta * (1 + cos(theta)) / (1 + cos(theta))
= lim theta->0 (1 – cos^2(theta)) / (theta * (1 + cos(theta)))
= lim theta->0 sin^2(theta) / (theta * (1 + cos(theta))) (using the trig identity: sin^2(theta) = 1 – cos^2(theta))
= lim theta->0 sin(theta) / (1 + cos(theta)) * sin(theta) / theta
= 1/2 * 1/1 * 0/0 (using the trig identity: sin(2theta) = 2sin(theta)cos(theta))
= 0
Therefore, the limit is 0.
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