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For π₯ β πΆβ , let π π₯ = π₯(π)
β
π=1
Show that f is not
continuous.
Prove that
i) π ππ₯ , ππ¦ = π d(x,y)
ii)π π + π₯ , π + π¦ = π π₯ , π¦
where d is a metric induced by on a normed space X
Let X be a normed linear space and Y a closed subspace of X
with Y β X ,if 0 < π < 1 prove that there exist
ππ π π π π’ch that ||Xr|| = 1And π < π ππ
, π β€ 1
Proof whether the following operations are inner product operations:
β¨x, yβ© = 2x1y1 β x1y2 β x2y1 + 2x2y2, x=(x1, x2), y=(y1, y2)
Show that the space L[a,b] of all square integrable functions on the interval [a,b] is a linear space over a vector field R
Show that the space LΒ²(R) of all square of summable real sequence is a linear space over a vector field R
Show that the space L(R) of all bounded real sequence is a linear space over a vector field R
Show that the space B[a,b] of all bounded real value functions on the interval [a,b] is a linear space over a vector field R
Show that the space R[a,b] of all Riemann integrable functions on the interval [a,b] is a linear space over a vector field R
How fast is the size of the population changing after 1 minute?Β
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#340153 on Dec 2023