and^11
n
f x nxdx
nfx nxdx
abab
∫ ′()cos ≤⋅∫|()||cos |′≤^1 ∫ = − → 0
nMdx Mb a
a nb ()where |f ′(x)| ≤ some M
Hence, f x nxdx n
a
b
∫ ()sin →→∞0 as- (d) : tan−−−tan = ⇒ = +
−
11
41
1ba ba
aπSo, length of interval lba a
a
= − = +
−1
12Using, dl
da
=0,at lmin, we have a=^12 −- (c) : When integrated once,
fx′()=+∫δδ 12 ()x ()xdx⋅ = θ 1 (x) + θ 2 (x) + c
f ′(0) = c = 0
So, f ′(x) = θ 1 (x) + θ 2 (x)
To find f (x), weintegrate f ′(x) or take the area covered
by θ 1 (x) and θ 2 (x).
Now the graphs of θ 1 (x) and (θ 2 )x are
So, f(5) = area of the shaded region
= (4 × 1) + (3 × 1) = 7- (a) : Combine the graphs
of θ 1 (x) and θ 2 (x) to get the
graph of f ′(x).
So, f ′(5) = 2 - (c) : From the graph, it is clear that f ′(x) is not
differetiable at two points x = 1 and x = 2. - (b) : The given curve equation is xy^2 = (x – 3y)^3 , a
homogeneous equation.
So,
dy
dxy
x==ie Q x.. ( ) x
So, y^2 + (Q(x))^2 = logπ represents a circle.- (c) : Q′(x) = 1 ⇒ Q′(1) = 1
- (b) : limsin ( ) limsin
xx
Qx
xx
→→x==
001
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