Differentiation/derivative OF polynomial || Geometric meaning OF derivative || Slope OF any curve || Derivative OF xn constant function || Curve & sketching OF polynomial vertex OF parabola || Condition OF max/min zero/roots OF polynomial || Example ||Discussion OF ex-22

Definition Of Differentiation|Geometrical Meaning Of Differentiation|Derivative Of A Constant|Power Rule|Contant Multiple Rule|Sum & Difference Rule|Product Rule|Quotient Rule|Derivative Of Trigonometric Functions|Derivative Of Logarithm & Exponential Function

Curve Sketching| Absolute max |min| nth derivative test

Double Differentiation|Maxima Minima|Differentiation Questions|Chain Rule|Power Chain Rule|Definition Of Differentiation|Geometrical Meaning Of Differentiation|Derivative Of A Constant|Power Rule|Constant Multiple Rule|Sum & Difference Rule|Product Rule|Quotient Rule|Derivative Of Trigonometric Functions|Derivative Of Logarithm & Exponential Function

Statement-1: There is a value of k for which the equation x^(3) - 3x + k = 0 has a root between 0 and 1. Statement-2: Between any two real roots of a polynomial there is a root of its derivation.

The below pictures are few natural examples of parabolic shape which is represented by a quadratic polynomial. A parabolic arc is an arc in the shape of a parabola. In structures, their curve represents an efficient method of load, and so can be found in bridges and the architechture in a variety of forms. If the zeroes of the quadratic polynomial are equal, where the discriminant D=b^(2)-4ac , then

The below picture are few natural examples of parabolic shape which is represented by a quadratic polynomial. A parabolic arch is an arch in the shape of a parabola. In structures, their curve represents an efficient method of load, and so can be found in bridges and in architecture in a variety of forms. If the roots of the quadratic polynomial are equal, where the discriminant D = b^2 - 4ac, then

The graph of a polynomial function is a smooth continuous curve. By looking at graph, we can find the number of zeros of the polynomial. Graphs are the geometrical meaning of the polynomials. They help us to understand their type, nature of its zeroes and coefficients of its various terms. Which of the above graph represents quadratic polynomials?

The below picture are few natural examples of parabolic shape which is represented by a quadratic polynomial. A parabolic arch is an arch in the shape of a parabola. In structures, their curve represents an efficient method of load, and so can be found in bridges and in architecture in a variety of forms. If the sum of the roots is -p and product of the roots is -1/p , then the quadratic polynomial is

The below picture are few natural examples of parabolic shape which is represented by a quadratic polynomial. A parabolic arch is an arch in the shape of a parabola. In structures, their curve represents an efficient method of load, and so can be found in bridges and in architecture in a variety of forms. If a and 1/a are the zeroes of the qudratic polynomial 2x^2 - x +8k then k is