Graphically estimate the values indicated and answer the question m(t) 2 lim m(t (a) t1 lim m(t) (b) t1 lim m(t) (c) t1 (d) m(1) (e) Is m continuous at t 1 ? Explain OYes. The function m is continuous at t 1 because the limit exists and is equal to the output value at t 1. O No. The function m is not continuous att 1 because even though the limit exists at t 1 it does not equal the output value of the function for t 1. O No. The function m is not continuous at t 1 because the limit does not exist at t 1. O No. The function m is not continuous at t 1 because the left portion of m as t approaches from the left and the right portion of m as t approaches from the right approach different values. ONo. The function m is not continuous at t 1 because even though the limit exists, the function is not defined at t 1.
Graphically estimate the values indicated and answer the question m(t) 2 lim m(t (a) t1 lim m(t) (b) t1 lim m(t) (c) t1 (d) m(1) (e) Is m continuous at t 1 ? Explain OYes. The function m is continuous at t 1 because the limit exists and is equal to the output value at t 1. O No. The function m is not continuous att 1 because even though the limit exists at t 1 it does not equal the output value of the function for t 1. O No. The function m is not continuous at t 1 because the limit does not exist at t 1. O No. The function m is not continuous at t 1 because the left portion of m as t approaches from the left and the right portion of m as t approaches from the right approach different values. ONo. The function m is not continuous at t 1 because even though the limit exists, the function is not defined at t 1.
College Algebra (MindTap Course List)
12th Edition
ISBN:9781305652231
Author:R. David Gustafson, Jeff Hughes
Publisher:R. David Gustafson, Jeff Hughes
Chapter3: Functions
Section3.3: More On Functions; Piecewise-defined Functions
Problem 99E: Determine if the statemment is true or false. If the statement is false, then correct it and make it...
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