- The math behind flappy bird - Mathematics Stack Exchange
You may have heard of this game called flappy bird, but even if you haven't, you should be able to understand this basic game: The player progresses through a series of obstacles The probability of
- User rdphibk - Mathematics Stack Exchange
Q A for people studying math at any level and professionals in related fields
- Newest population-dynamics Questions - Mathematics Stack Exchange
Q A for people studying math at any level and professionals in related fields
- Difference between ≈, ≃, and ≅ - Mathematics Stack Exchange
In mathematical notation, what are the usage differences between the various approximately-equal signs "≈", "≃", and "≅"? The Unicode standard lists all of them inside the Mathematical Operators B
- Largest constant $C$ such that $| (1+\sqrt {x})\sin (\pi\sqrt {x})| gt;C . . .
Good catch Thank you I've modified the solution Would something like this work?
- Applying Leibnizs Rule to Double Integrals with Variable Limits
Let $$ \begin {aligned} H_1 (z_1,z_2,x_1) =\int_0^ {z_2+\frac {\alpha_1} {\alpha_2} (z_1-x_1)}\varphi (x_1,x_2)\mathrm {d}x_2\\ G_1 (z_1,z_2) =\int_0^ {z_1}H_1 (z_1,z
- Sign of a Gaussian expectation - Mathematics Stack Exchange
We have $$\begin {align*} I (g) = \mathbb {E}\biggl [ \frac {1-2\sinh^2 X} { (1+\sinh^2 X)^3} \biggr] \\ = \frac {1} {\sqrt {2\pi g}} \int_ {-\infty}^ {\infty
- ordinary differential equations - The solution of ODE using Frobenius . . .
How to state the convergence of the solution of this ODE and what is the solution? Also, Is there online site to check its solution so that I could analyse it whether my answer is correct, MatLab,
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