"Published in Newark, California, USA"
Find y' for
Solution:
Consider the given equation above
Since the given equation is a simple quadratic equation, then we can use the derivative by power formula as follows
Therefore, the answer is
This website will show the principles of solving Math problems in Arithmetic, Algebra, Plane Geometry, Solid Geometry, Analytic Geometry, Trigonometry, Differential Calculus, Integral Calculus, Statistics, Differential Equations, Physics, Mechanics, Strength of Materials, and Chemical Engineering Math that we are using anywhere in everyday life. This website is also about the derivation of common formulas and equations. (Founded on September 28, 2012 in Newark, California, USA)
Tuesday, December 3, 2013
Derivative - Algebraic Functions, Powers, 3
Category: Differential Calculus
"Published in Newark, California, USA"
Find y' for
Solution:
Consider the given equation above
Since the given equation is a simple quadratic equation, then we can use the derivative by power formula as follows
Therefore, the answer is
"Published in Newark, California, USA"
Find y' for
Solution:
Consider the given equation above
Since the given equation is a simple quadratic equation, then we can use the derivative by power formula as follows
Therefore, the answer is
Monday, December 2, 2013
Derivative - Algebraic Functions, Powers, 2
Category: Differential Calculus, Algebra
"Published in Newark, California, USA"
Find y' for
Solution:
Consider the given equation above
Since the given equation is a product of two binomials, then we have to get the derivative of the given equation using the derivative by product formula as follows
Therefore, the answer is
"Published in Newark, California, USA"
Find y' for
Solution:
Consider the given equation above
Since the given equation is a product of two binomials, then we have to get the derivative of the given equation using the derivative by product formula as follows
Therefore, the answer is
Sunday, December 1, 2013
Derivative - Algebraic Functions, Powers
Category: Differential Calculus, Algebra
"Published in Newark, California, USA"
Find y' for
Solution:
Consider the given equation above
There are two ways in getting the derivative of the given equation. First, you can get the product of two functions first by applying the distributive property of multiplication over addition and then apply the derivative by power formula. Let's get the derivative of the given equation as follows
You can also get the derivative of the given equation by product formula as follows
Note: The derivative of any constant is always equal to zero.
"Published in Newark, California, USA"
Find y' for
Solution:
Consider the given equation above
There are two ways in getting the derivative of the given equation. First, you can get the product of two functions first by applying the distributive property of multiplication over addition and then apply the derivative by power formula. Let's get the derivative of the given equation as follows
You can also get the derivative of the given equation by product formula as follows
Note: The derivative of any constant is always equal to zero.
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