Determine the limit of the function, f(x), by squeezing it between an upper bound, h(x), and a lower bound, g(x), at the point of interest. Squeeze Theorem: sin Limit at x= 0 0.06 - Function Comments 0.04 - Questio sin(1/x)*x 0.02- n: Upper Bound -0,08 -0.06 -0,04 -0.02 0 - 0.02 0.04 0.06 0.08 Define h(x) -0.02- -0.04- Lower Bound -0.06- Define g(x) (-) f (x) a Choose -.9819e-1 a and c 9819e-1 Check Check Reset

Determine the limit of the function, f(x), by squeezing it between an upper bound, h(x), and a lower bound, g(x), at the point of interest.

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Determine the limit of the function, f(x), by squeezing it between an upper bound, h(x), and a lower bound, g(x), at the point of interest. ()- Squeeze Theorem: sin Limit at x= 0 0.06 - Function Comments 0.04 - Questio sin(1/x)*x 0.02 - n: Upper Bound -0,08 -0.06 -0,04 -0.02 0- 0.02 0.04 0.06 0.08 Define h(x) -0.02- (:) = -0.04- Lower Bound -0.06- Define g(x) (-) f (x) a 3= Choose -.9819e-1 a and c .9819e-1 Check Check Reset