Relation between time and distance x is given by the equation t equal to alpha square plus beta x where i find beta constant is visa velocity then acceleration
Answers
answer : -2av³
explanation : The relation between time t and distance x is given by, t = ax² + bx, where a and b are constants.
let's differentiate t with respect to x,
i.e., dt/dx = d(ax² + bx)/dx
or, dt/dx = 2ax + b .....(1)
we know, velocity is the rate of change of displacement with respect to time.
i.e., v = dt/dx
from equation (1),
dt/dx = 1/{dx/dt} = 1/v = 2ax + b
or, v = 1/(2ax + b) ......(2)
now differentiating v with with respect to time, t
dv/dt = d{1/(2ax + b)}/dt
= -1/(2ax + b)² × d(2ax + b)/dt
= -1/(2ax + b)² × [2a × dx/dt ]
= -1/(2ax + b)² × 2a v
from equation (2),
dv/dt = -v² × 2av = -2av³
we know, acceleration/retardation is the rate of change of velocity with respect to time.
i.e., A = dv/dt
so, dv/dt = A = -2av³
[here negative sign shows retardation.]
Answer:
= ax2 + bx Differentiate w.r.t time 1 = 2ax dxdt + b dxdt dxdt = 12ax + b V = 12ax + b ...(1) a = dVdt = -(2a dxdt)(2ax + b)2 a = -2av(2ax