application-of-derivatives-8

Q.4. If at each point of curve y = x³ - ax² + x + 1 tangent is inclined at acute angle with +ve direction of x-axis. Find interval in which a lies.

Ans: y = x³ - ax² + x + 1
Sine tangent is inclined at an acute angle with the direction of x-axis.

     = 3x² - 2ax + 1 0 for all x R
But if ax² + bx + c 0 for x R
a > 0   &   D 0
D = (2a)² - 4(3)(11)
   = 4(a² - 3)
D 0
(a² - 3) 0   (a - )(a + ) 0
- a


Dumb Question: How 0 if angle is acute.

Ans: Since = tan & if is lessthan . So, tan 0. So, 0


Q.5. If f(x) = log_ex   &   g(x) = x²   &   c (4, 5), then find value of   c log

Ans: log(4²⁵) - log5¹⁶
       25 log4 - 16 log5
Since domain is [4, 5]
So, let
Ø(x) = x² (log4) - 16 logx i9s cont. [45, 5] & differentiable on (4, 5)
By LMUT,
, c (4, 5)
Ø(5) - Ø(4) = log
But, Ø'(c) = (c² log4 - 8) ........................................ (i)
also Ø'(c) = ........................................... (ii)
By (i) & (ii)
    (c² log_e4 - 8) = log_e
c log = 2(c² log4 - 8)


Hard Type:

Q.1. Let S be square of unit area. Consider aany quadrilateral which has one vertex on each side of s. If a, b, c, & d denote lengths of side of quadrilateral, prove that
2 a² + b² + c² + d² 4

Ans:

Let S be square of unit area & ABCD be quadrilateral of sides a, b, c & d
a² = (1 - x)² + z²
b² = w² + (1 - z)²
c² = (1 - w)² + (1 - y)²
d² = x² + y²
a² + b² + c² + d² = {x² + (1 - x)²} + {y² + (1 - y)²} + {z² + (1 - z)²}
                            + {w² + (1 - w)²}
where 0 x, y, z, w 1
Let f(x) = x² + (1 - x)²,   0 x 1
Then f'(x) = 2x - 2(1 - x)
       f'(x) = 0   for min/max.
   4x - 2 = 0   x =
Again f''(x) = 4 > 0 when x =
f(x) is min. at x =   &   m,ax. at x = 1
a² + b² + c² + d² = 4{x² + (1 - x)²}
Max. value of   x² + (1 - x)² = 1² + (1 - 1)² = 1
Min. value of x² + (1 - x)² =

2 a2 + b2 + c2 + d2 4

Q.2. Let a + b = 4   &   a < 2   & let g(x) be differentiable function. If > 0 v x prove that increases as (b - a) increases.

Ans: Let (b - a) = t   & since a + b = 4
a =   &   b =   &   t > 0
[Dumb Question: Why t = b - a > 0 ?
 Ans: Since a < 2 &n &   a + b = 4. So, b > 2
  b - a > 0   or   t > 0]

   Ø(t) =   [By Leibniz rule]

[Dumb Question: What is Leibniz rule ?
 Ans: Ø(t) = ]

Ø'(t) = g(f(x)) f'(x)
Since g(x) is increasing
x₂ > x₁   g(x₂) > g(x₁)
Now, >   &   g(x) is increasing

Ø'(t) = > 0
Ø'(t) > 0
Ø'(t) is increases as t increases.


Q.3. Tangent represented by graph of function y = ... at the point with absciss a x = 1 from an angle & at point x = 2 an angle of & at the point x an angle of . Find value of .

Ans: Given
at x = 1, = tan =
at x = 1, f'(1) = tan =
at x = 2 f'(2) = tan =
at x = 3 f'(3) = tan = 1
Then,  
Let   f'(x) = t
       f''(x) dx = dt
  
  
  


Key Words:

* Derivative.
* TAngent.
* Normal.
* Orthogonal Curves.
* Sub Tangent.
* Sub Normal.
* Rolle's Theorem.
* Layrange's Mean Value Theorem.
* Maxima.
* Minima.
* Monotonicity.