What is dimensional homogeneity?

Establish the equation v^(2) =u^(2)+2fs by using graph where symbols used carry the usual meaning. (Graph sheet is not required .)

Identify the statement(s) which is/are true. (a) f( x , y )= e^( y/ x )+tan y/ x is a homogeneous of degree zero. (b) xln y/ x dx+ y^(2)/ x *sin^-1(y/ x ) dy=0 is a homogeneous differential equation. (c) f( x ,y )= x^(2)+sinx cosy is a non homogeneous. (d) ( x^(2)+ y^(2))dx-(x y^(2)-y^(3))dy=0 is a homogeneous differential equation.

Show that the differential equation (x - y) (dy)/(dx) = x + 2y is homogeneous and solved it.

Establish the equation, v^2 = u^2 + 2fs by using graph, where symbols used carry the usual meaning. (Graph,sheet is not required.)

Can we derive v= u+ at , using dimensional analysis ?

Let us consider n equation , (1//2)mv^2 =mgh, where m is the mass of the body, v its velocity, g is acceleration due to gravity and h is the height. Check whether this equation is dimensionally correct.

Let us consider an equation (1)/(2)mv^(2)=mgh Where m is the mass of the body. V its velocity , g is the acceleration due to gravity and h is the height . Check whether this equation is dimensionally correct.

Let the sides of a parallelogram be U=a, U=b,V=a' and V=b', where U=lx+my+n, V=l'x+m'y+n'. Show that the equation of the diagonal through the point of intersection of U=a, V=a' and U=b, V=b' " is given by " |{:(U,V,1),(a,a',1),(b,b',1):}| =0.

Show that the differential equation y^3dy+(x+y^2)dx=0 can be reduced to a homogeneous equation.