Mathematics Multiple Choice Questions on “Differentiability”.
1. Find the derivative of f(x) = sin(x2).
a) -sin(x2)
b) 2xcos(x2)
c) -2xcos(x2)
d) -2xsin(x2)
Answer: b
Clarification: Differentiation of the function f(x) = sin(x2) is done with chain rule. First we differentiate sin function which becomes cos and then differentiate the inner (x2) which becomes 2x, hence it comes out to be 2xcos(x2).
2. What is derivative of xn?
a) n
b) nxn
c) nxn-1
d) nxn-2
Answer: c
Clarification: It is a standard rule for derivative of a function of this form in which the original power comes in front and the value in the power is decreased by one. Therefore the only option of this form is nxn-1 from the given options.
3. Find derivative of tan(x+4).
a) sec2(x+4)
b) 4 sec2(x+4)
c) 4x sec2(x+4)
d) sec2(x)
Answer: a
Clarification: We know that derivative of tanx is sec2(x), now in the above question we get tan(x+4), hence its derivative comes out to be sec2(x+4), as the inside expression (x+4) is differentiated into 1.
Therefore the answer is sec2(x+4).
4. What is value of (frac{dy}{dx}) if x-y = 1?
a) 1
b) 2
c) -1
d) 2
Answer: a
Clarification: We know x-y = 1, hence we differentiate it on both sides-:
We get 1- (frac{dy}{dx}) = 0, (frac{dy}{dx}) = 1, hence the value of (frac{dy}{dx}) comes out to be 1.
5. Value after differentiating cos (sinx) is _________
a) sin (sinx).cosx
b) -sin (sinx).cosx
c) sin (sinx)
d) sin (cosx).cosx
Answer: b
Clarification: We differentiate the given function with the help of chain rule so we first differentiate the outer function which becomes –sin and then we differentiate the inner function sinx which is differentiated and comes out to be cosx, hence the differentiated function comes out to be -sin (sinx).cosx.
6. Value after differentiating cos (x2+5) is ________
a) 5.sin (x2+5)
b) -sin (x2+5).2x
c) sin (x2+5).2x
d) cos (x2+5).2x
Answer: b
Clarification: We differentiate the given function with help of chain rule and hence the outer function becomes –sin and the inner function is differentiated into 2x, therefore the answer comes out to be -sin (x2+5).2x.
7. Find (frac{dy}{dx}) of 2x+3y = sinx.
a) (frac{cosx-2}{3})
b) (frac{cosx-2}{2})
c) (frac{cosx-3}{2})
d) (frac{sinx-2}{3})
Answer: a
Clarification: Differentiating on both sides we get 2 + 3(frac{dy}{dx}) = cosx.
3(frac{dy}{dx}) = cosx-2.
(frac{dy}{dx} = frac{cosx-2}{3}).
8. What is derivative of cotx?
a) tanx
b) –sec2x
c) –cosec2x
d) cosec2x
Answer: c
Clarification: The derivative of cotx is –cosec2x, as this function has a fixed derivative like sinx has its derivative cosx. Therefore the answer to the above question is –cosec2x.
9. If (y = tan^{-1}(frac{3x-x^3}{1-3x^2}), frac{-1}{sqrt{3}} < x < frac{-1}{sqrt{3}})
a) 3
b) (frac{3}{1+x})
c) –(frac{3}{1+x^2})
d) (frac{3}{1+x^2})
Answer: d
Clarification: Given function is (y = tan^{-1}(frac{3x-x^3}{1-3x^2})),
Now taking RHS and substituting x = tang in it and then we get,
y = (tan^{-1}(frac{3tang-tang^3}{1-3tang^2})), Now it becomes the expansion of the function tan3g,
Hence the given function becomes y= tan-1(tan3g). Which is equal to 3g, now substituting the value of g= tan-1x, now after differentiating both sides we get the answer (frac{3}{1+x^2}).
10. Find (frac{dy}{dx}) of y = sin (ax + b).
a) a.cos (ax + b)
b) b.sin (ax + b)
c) a.sin (ax + b)
d) a.cos (ax + b)
Answer: a
Clarification: We differentiate the given function with the help of chain rule and hence
the outer function is differentiated into cos, and the inner function comes out to be a and the constant b becomes 0, which is multiplied to the whole function and the answer comes out to be
=> a.cos (ax + b).