JEE Advanced Level Test: Application of Derivative- 2 - JEE MCQ

Find Value of ‘c’ by using  Rolle’s theorem for f (x) = log (x² + 2) - log 3 on [-1,1]

The chord joining the points where x = p and x = q on the curve y = ax² + bx + c is parallel to the tangent at the point on the curve whose abscissa is 

The least value of k for which the function f(x) = x² + kx + 1 is a increasing  function in the interval 1 < x < 2

The interval in  which f (x) = x³ - 3x² - 9x + 20 is strictly decreasing 

The critical points of

The number of stationary points of f (x) = sin x in [0,2π] are

Local minimum values of the function 

If the function has maximum at x =-3, then the value of ‘a’ is 

The point at which f (x) = (x- 1)⁴ assumes local maximum or local minimum value are

The global maximum and global minimum of f (x) = 2x³ - 9x² + 12x + 6 in [0, 2]

The approximate value of 

The approximate value of 

If the percentage error in the surface area of sphere is k, then the percentage error in its volume is 

If an error of  is made in measuring the radius of a sphere then percentage error in its volume is

The height of a cylinder is equal to its radius. If an error of 1 % is made in its height. Then the percentage error in its volume is

The slope of the normal to the curve given by 

The line   is a tangent to the curve  then n ∈

The points on the curve  at which the tangent is perpendicular to x-axis are

The point on the curve   at which the tangent drawn is

The sum of the squares of the intercepts on the axes of the tangent at any point on the curve x ^2/3 + y^2/3= a^2/3 is

If the straight line x cos α + y sinα = p touches the curve  at the point (a, b) on it, then

If the curves x = y² and xy = k cut each other orthogonally then k² = 

The angle between the curves y = x³ and 

If the curves ay + x² = 7 and x³ = y cut orthogonally at (1, 1) then a = 

A particle moves along a line is given by then the distance travelled by the particle before it first comes to rest is

A particle is moving along a line such that s = 3t³ - 8t + 1. Find the time ‘t’ when the distance ‘S’ travelled by the particle increases.

A particle moves along a line by S = t³ - 9t² + 24t the time when its velocity decreases.