Mathematics, 30.11.2019 06:31, lisnel
The derivation in example 6.6.1 shows the taylor series for arctan(x) is valid for all x β (β1,1). notice, however, that the series also converges when x = 1. assuming that arctan(x) is continuous, explain why the value of the series at x = 1 must necessarily be arctan(1). what interesting identity do we get in this case?
Answers: 1
Mathematics, 21.06.2019 13:30, castiaulii16
Phillip had some bricks. he stacked them in 6 equal piles. which expression shows the number of bricks phillip put in each pile? let the variable m stand for the unknown number of bricks. m + 6 mΓ·6βββ mβ6βββ 6m
Answers: 3
Mathematics, 21.06.2019 19:30, tsmalls70988
What is the image of c for a 90Β° counterclockwise rotation about a? (3, 7) (-1, 3) (7, 3)
Answers: 1
The derivation in example 6.6.1 shows the taylor series for arctan(x) is valid for all x β (β1,1). n...
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