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Give an upper bound and a lower bound for the expression 1/(a^(4)+3a^(2)+1) if a∈R
Let (X d) be metric space and X is unbounded then d_(1) defined as d_(1)=(d(x y))/(1+d(x y)) x y in X is
a)metric and unbounded
b)metric but may be bounded or unbounded c)metric and bounded
Show that x inverse is not equal to 0 and is unique
Prove A∩(B∩C)=(A∩B)∩C
(a) Justify that In is welled defined and determine its sign.
(b) Show that In is a decreasing sequence.
A mapping f is defined in R^(2*2) , the set of all square matrices of order 2 with entries in R by f: R^(2*2) → R^2
A → Av where v = (-1 2).
(a) Show that f is a linear mapping.
(i)Deduce that for all n E N, we have ㅣUn - sㅣ<= (1/4)^n+1.
Hence, study the convergence of the sequence (Un) and precise its limits.
(i)Show that Un E I.
(ii) Show that for all n E N, we have ㅣU(n+1) - sㅣ <= 1/4ㅣUn - sㅣ Where s Eb(1/4, 1/2)
show that the series 1 - 1/2³ + 1/3³ - 1/4³ + 1/5³ - .... is absolutely convergent
if a sequence ⟨Sn⟩ is defined by Sn = Sn/1-Sn-1, s>0, s1>0. then show that the sequence converges to the positive root of the equation x²+x-5=0
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#339914 on Dec 2023