I want to calculate a double integral of an arbitrary function (f) inside the region of intersection of two other functions. Please suggest a fast and convenient approach. clear JJ = 5; II = 5; W = rand(II, JJ); symsx y w = sym('0'); ...
z = (1./(Fo-Fo_1).^(3./2)).*exp(-(R(p).^2+1)./(4*(Fo-Fo_1))).*exp((2.*R(p).*cos(phi-phi_1))./(4*(Fo-Fo_1))).*(exp(-(Z(k)-B.*phi_1./(2*pi)).^2./(4*(Fo-Fo_1)))-exp(
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to calculate the percentage of a number, we need to use a different formula such as: p% of number = x where x is the required percentage. if we remove the % sign, then we need to express the above formulas as; p/100 * number = x example: calculate 10% of 80. let 10% of 80...
I assume here that the x,y area you speak of is the entire rectangle defined by the four corners (0,0), (201,0), (201,301), and (0,301).
and how to calculate it. Thank you in advance functional-analysis complex-analysis integration integral-transforms Share Cite Follow asked Nov 7 at 8:10 Ryo Ken 10155 bronze badges Add a comment 1 Answer Sorted by: 1 Partial answer. By rotational invariance, the integral depends only on...
Second way to define a function g=x**2+1 Check g(3) value: g.subs(x,3) 10 Calculate an integral integrate(x**2+x+1,x) $\displaystyle \frac{x^{3}}{3} + \frac{x^{2}}{2} + x$ integrate(t**2*exp(t)*cos(t))
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Mathematically, the p-value is calculated using integral calculus from the area under the probability distribution curve for all values of statistics that are at least as far from the reference value as the observed value is, relative to the total area under the probability distribution curve. Sta...