Prove that • Ụ ( ¹⁄2, ¹ − ¹ ) = (0, 1). 72 n>2 ● U ,1 - ¹] = (0, 1). 72 n>2 n (0,1/2) = 6. n>2 • U (R™\B(a, ½)) = R™\{a}. n>2

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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2. Prove that
●
U (1,1-¹) = (0, 1).
n>2
U,1- (0, 1).
n
=
n>2
n (0,1/2) = 6.
n>2
U (Rm\B(a, ¹)) = R™\{a}.
n>2
Transcribed Image Text:2. Prove that ● U (1,1-¹) = (0, 1). n>2 U,1- (0, 1). n = n>2 n (0,1/2) = 6. n>2 U (Rm\B(a, ¹)) = R™\{a}. n>2
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