math:calculus

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math:calculus [2019/12/22 22:36] – [Derivative] phreazermath:calculus [2019/12/22 23:28] (current) – [Differential equations] phreazer
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 Example of a straigth line $y=mx+b$, $m=\Delta y / \Delta x$ Example of a straigth line $y=mx+b$, $m=\Delta y / \Delta x$
  
-Differential quotient:+"Differentialquotient":
  
 $m = \lim_{x_1 -> x_0} \frac{f(x_1) - f(x_0)}{x_1 - x_0}$ $m = \lim_{x_1 -> x_0} \frac{f(x_1) - f(x_0)}{x_1 - x_0}$
 +
 +$f'(x) = \frac{d}{dx} f(x) = \lim_{h -> 0} \frac{f(x + h) - f(x)}{h}$
 +
 +$f''(x) = \frac{d^2}{dx^2} f(x)$
  
 Geometrically, derivative of f at point x=a is slope of tangent line.  Geometrically, derivative of f at point x=a is slope of tangent line. 
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 Differential operator Differential operator
  
-$y' = 2y + x^2$ => $f'(x)=2*f(x)+x^2$ =$\frac{dy}{dx} = 2y + x^2$+$f'(x)=f(x)^2 * x
 + 
 +$\frac{dy}{dx} = y^2 * x$ 
 + 
 +$dy y^2 * x {dx}$ 
 + 
 +$\frac{1}{y^2} dy = x {dx}
 + 
 +$\int \frac{1}{y^2} dy = \int x {dx}
 + 
 +$-y^{-1} + c_1 1/2 x^2 c_2$ 
 + 
 +$-(1/y)  = 1/2 x^2 + c_2 - c_1$(c_2 - c_1 = c)$ 
 + 
 +$y = \frac{-1}{(1/2 x^2 + c)}$ (y is a function not value, obviously) 
 + 
 +=== Types === 
 + 
 +$y' + f(x) y = g(x)$ first order, linear, "homogen" if g(x) = 0, else "inhomogen" ("Störfunktion"
 + 
 +Solve inhomogen eqs: 
 + 
 +$y'' + a_1 y' + a_0 * y = g(x)$ 
 + 
 +$y(x) = y_a(x) + y_p(x)$ 
 + 
 +General solution of homogen DE $y_a(x)$ (set to 0, solve with characteristic polynom) 
 +"Particular" solution of inhomogen DE $y_p(x)$ 
 + 
 +v=6jypcZkrvLM 
 +Mit Störfkt, charakteristisches Polynom, lösen. 
  
  • math/calculus.1577050599.txt.gz
  • Last modified: 2019/12/22 22:36
  • by phreazer