← 2024 Paper 2
UPSC 2024 Maths Optional Paper 2 Q3b — Step-by-Step Solution
20 marks · Section A
Uniform Convergence: Term-by-Term Differentiation · Real Analysis · Read the full method →
Question
The sum of the first n terms of ∑Un(x) on [0,1] is Sn(x)=2n21log(1+n4x2). Show that the series can be differentiated term-by-term, though ∑Un′(x) does not converge uniformly on [0,1].
Technique
Compute pointwise limits of Sn and Sn′; locate the maximum of Sn′ to show non-uniformity.
Solution
Step 1 — Pointwise limit S(x)
For x=0: Sn(0)=0 for all n. For x∈(0,1]: log(1+n4x2)∼4logn, so Sn(x)∼2logn/n2→0.
Therefore S(x)=0 on [0,1], and S′(x)=0.
Step 2 — Pointwise limit of Sn′
Sn′(x)=2n21⋅1+n4x22n4x=1+n4x2n2x.
For x∈(0,1]: Sn′(x)∼1/(n2x)→0 as n→∞. Also Sn′(0)=0.
So limnSn′(x)=0=S′(x) pointwise on [0,1].
Therefore ∑Un can be differentiated term-by-term: both the sum and the derivative of the sum equal 0 on [0,1].
If convergence were uniform, then supx∈[0,1]∣Sn′(x)∣→0. Maximising Sn′(x)=n2x/(1+n4x2): setting the derivative to zero gives x⋆=1/n2, at which
Sn′(1/n2)=1+1n2⋅(1/n2)=21.
So sup∣Sn′(x)∣≥1/2 for every n — the supremum never tends to 0. Hence Sn′ does not converge uniformly to S′=0 on [0,1].
![Graphs of S_n'(x)=n^2x/(1+n^4x^2) for n=2,5,10 on a logarithmic x-axis. Every curve attains the same maximum height \tfrac12, but its peak sits at x=1/n^2, which marches leftward toward 0 as n grows. The common peak height never shrinks, so \sup_{[0,1]}|S_n'|=\tfrac12\not\to 0 — convergence is non-uniform.](/figures/2024-P2-Q3b-spike.svg)
Answer
∑Un is term-by-term differentiable (both limits equal 0); but ∑Un′ converges pointwise but not uniformly on [0,1].