No Limit Time
No Limit in Time
999 0 l than a t
The equation for the period (T) of a simple pendulum is T = 2π√(L/g), where L is the length of the pendulum and g is the acceleration due to gravity.
The physics equation for the period of a pendulum is T 2(L/g), where T is the period, L is the length of the pendulum, and g is the acceleration due to gravity.
The equation for the average over time T is integral 0 to T of I.dt
This equation is based on the Sine function Let w = 2 Pi f The basic V I equation for an inductor is V(t) = L d/dt I(t) Now I(t) = A Sin(w t) V(t) = L d/dt I(t) V(t) = L A w Cos(w t) Z = Vrms / Irms Now Vrms = A L w /Sqrt(2) Irms = A/Sqrt(2) Therefore Z = Vrms / Irms ( A L w /Sqrt(2)) ----------------------- ( A/Sqrt(2) ) Equals L w L 2 Pi f
They fit the equation t = 0 exactly.
Laplace equation: in 3D U_xx+U_yy+U_zz=0 Or in 2D U_xx+U_yy=0 where U is a function of the spatial variables x,y,z in 3D and x,y in 2D.Also, U_xx is the second order partial derivative of u with respect to x, same for y and z. Laplace transform: L(f(t))=integral of (e^(-s*t))*f(t) dt as t goes from 0 to infinity. Laplace transform is more like an operator rather than an equation.
Yes, although logically d = d + vt + 0.5at2 is equivalent to vt + 0.5at2 = 0 Term by term: d = [L] vt = [LT-1]*[T] = [L] 0.5at2 = [][LT-2][T2] = [L] where L = Length and T = Time.
the velocity of water flow within a drainage pipe; the equation is V=L/t L= Length t=time. Then the flow rate; Fr=A*V, Where A= sectional area and V = velocity.
No Limit in Time
Set x = r*sin(t) and y = r*cos(t) then r = sqrt(x^2 + y^2) and t = arctan(y/x) if x not 0, t = pi/2 if x = 0.