Prove (dy/dx) = (d/dx)(cv) = c(dv/dx), if y = cv

Описание к видео Prove (dy/dx) = (d/dx)(cv) = c(dv/dx), if y = cv

The derivative of the product of a constant and a function formula. Prove (dy/dx) = (d/dx)(cv) = c(dv/dx), if y = cv, or the derivative of y with respect to x of the product of a constant and a function is equal to a constant times the derivative of v with respect to x, if y = cv.

Proving this formula by means of the method of differentiation involving limits and increments.

Mharthy's Channel's Playlists:

Differential Calculus    • Prove f'(x) = nx^(n-1), if f(x) = x^n...  

Complex Numbers    • Prove:⁡⁡  (a⁡+⁡b⁡i)(c⁡+⁡d⁡i)⁡ = ⁡(ac⁡...  

Conversions    • Conversions  

Logarithms, etc.    • Logarithms, etc.  

Analytic Geometry    • Analytic Geometry  

Plane Trigonometry Basics    • Plane Trigonometry Basics  

Fractions    • Fractions  

Systems of first degree/linear equations    • Systems of first degree/linear equations  

Exponents and Radicals    • Exponents and Radicals  

Quadratic Equation and Formula, etc.    • Quadratic Equation and Formula, etc.  

Division of Polynomials, etc.    • Division of Polynomials, etc.  

The Binomial Theorem    • The Binomial Theorem  

Trigonometric Formulas    • Trigonometric Formulas  

The Exact Values of sin & cos Functions of a Right Triangle    • The Exact Values of sin and cos Funct...  

Trigonometric Identities 1    • Trigonometric Identities 1  

Trigonometric Identities 2    • Trigonometric Identities 2  

Trigonometric Identities 3    • Trigonometric Identities 3  

Комментарии

Информация по комментариям в разработке