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Show that lim πββ 1 /π [sin( π/ π ) + sin( 2π/ π ) + β¦ + sin( ππ/ π )] = 2/ π .
Show that π(βπ, π) = βπΏ(π, π) and πΏ(βπ, π) = βπ(π, π).Β
Let π be differentiable. Show that if limπ₯ββ π(π₯) = πΏ β β then limπ₯ββ π β² (π₯) = 0. Provided that the latter limit is existing. Give an example where the converse is not true. Also give an example for which the limit of π β² is not existing even though the limit of π is the same as given
Let π be differentiable. Show that if limπ₯ββ π(π₯) = πΏ β β then limπ₯ββ π β² (π₯) = 0. Provided that the latter limit is existing. Give an example where the converse is not true. Also give an example for which the limit of π β² is not existing even though the limit of π is the same as given.
Β Let π be differentiable. Show that if lim π₯ββ
π(π₯) = πΏ β β then lim π₯ββ
πβ²(π₯) = 0. Provided that the latter limit is existing. Give an example where the converse is not true. Also give an example for which the limit of πβ² is not existing even though the limit of π is the same as given.Β
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