`v="gt" , h=1/2"gt"^2 , v=u+at, v^2=2gh`

Which one of the following is the equation for Position - Time relation? A) S= "ut" +1//2 "at"^2 B) V = u + at C) U = y + at D) 2as = v^2 – u^2

Velocity at a general point P(x, y) for a horizontal projectile motion is given by v=sqrt((v_("x")^(2)+v_("y")"^(2))),tan alpha=(v_(y))/(v_(x)) alpha is angle made by v with horizontal in clockwise direction Trajectory equation for a horizontal projectile motion is given by x=v_(x)t=ut y=- (1//2)"gt"^(2) eliminating t, we get y=-(1//2)(gx^(2))/(u^(2) An aeroplane is flying horizontally with a velocity of 720 km/h at an altitude of 490 m. When it is just vertically above the target a bomb is dropped from it. How far horizontally it missed the target?

Let y = uv be the product of the functions u and v . Find y'(2) if u(2) = 3, u'(2) = – 4, v(2) = 1, and v'(2) = 2.

u and v are two non-collinear unit vectors such that |(widehat u+hat v)/(2)+widehat u xxhat v|=1. Prove that |widehat u xxhat v|=|(widehat u-hat v)/(2)|

An Aeroplane flies horizontaily at a height h at a speed v. An anti-air craft gun fires a shell at the plane when it is vertically above the gun. Show that the minimum muzzle velocity required to hit the plane is sqrt(v^2+2gh) at an angle tan^(-1)((sqrt(2gh))/(v))

A jet plane files horizonally at a height h at a speed v. An anti-aircraft gun fires a shell at the plane when it is vertically above the gun. Show that the minimum muzzle speed required to hit the plane is sqrt(v^(2)+2gh) at an angle tan^(-1)sqrt(2gh)/(v)

Statements : X gt Y, Y gt Z, Z = V, C lt W Conclusions : I. Y = V II. Y gt V

If y=sqrt(u) ,u=(3-2v)v and v=x^(2) , then (dy)/(dx)=

For any two vectors vec u and vec v prove that (vec udot v)^(2)+|vec u xxvec v|^(2)=|vec u|^(2)|vec v|^(2)