erivative is a measure of how a function changes as its input changes. Loosely speaking, a derivative can be thought of as how much one quantity is changing in response to changes in some other quantity.- Source : Wikipedia
Calculus is used to solve differentiation of any subjective equation and the equivalent output result. we need to find f(x) where, d/dx f(x) = g(x).The derivative of constant is zero in calculus. The linear equations are also compared using calculus. Integration is considered as one of most important study of calculus in mathematics. British mathematician, Isaac Newton and the German man Gottfried Leibnitz, invented the calculus. The methods that are applied in continous graphs, curves or fucntions is calculus.
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Steps to solve the Derivative function:
Derivative problem 1:
Find the first derivative and second derivative of
f(x) = x4 + 7x3 - 3x2 - 9x +3
Solution:
Step 1: First differentiate f(x) = x4 + 7x3 - 3x2 - 9x +3
Step 2: when we differentiate the first term we get (1 × 4) x (4-1)
Step 3: The above equation can above simplified as 4 x 3
Step 4: Like wise we can differentiate and simplify all the terms in the equation
Step 5: Finally after the first derivative we will get 4 x 3 + 21 x2 - 6x - 9
Step 6: Now we will go for Second derivative
End of the second derivative we will get 12x2 + 42 x - 6
First derivative:
f' = (df )/ (dx)
= (1 × 4) x (4-1) + (7 × 3)x(3-1) - (3 × 2)x(2-1) - (9 × 1)x (1-1)
= 4 x 3 + 21 x2 – 6x - 9
Second derivative:
f '' = (df ' )/ (dx)
= 4 x 3 + 21 x2 – 6x - 9
= 12x2 + 42 x - 6
Answer:
(d^2)/(dx^2) (x4 + 7x3 - 3x2 - 9x +3) = 12x2 + 42 x - 6
Derivative problem 2:
Find the differential for y = sqrt(2x^3 - 9x)
Solution:
Step 1: First turn sqrt(2x^3 - 9x)to (2x3 - 9x)1/2
Step 2: Differentiate in the usual method
Step 3: Then finally we get,
d/(dx) ((2x3 - 9x)1/2 ) = ½ ( 2x3 - 9x ) ½ -1( 6x2 - 9 )
= ½ ( 2x3 - 9x ) -1/2( 6x2 - 9 )
= ( 6x^2 - 9 ) / (2 sqrt (2x^3 - 9x ))
Answer of given calculus test exam problem is
d/(dx) ((2x3 - 9x)1/2 ) = ( 6x^2 - 9 ) / (2 sqrt (2x^3 - 9x ))
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Derivative practice problem:
Derivative practice problem 1:
Find the derivative of f(x) = ( x - 5 ) ( 2x + 1 )
Answer: d/(dx) f(x) = 4x - 9
Derivative practice problem 2:
Differentiate the given equation with respect to t. y = 8t3 + 12t
Answer: 24t2 + 12
