If G =(7, 8) and H=(5,4,2), find `G xx H and H xx G`.

If U = { a, b, c, d, e, f, g, h} , find the complements of the following sets : D = { f, g, h, a}

If U = { a, b, c, d, e, f, g, h} , find the complements of the following sets : C = {a, c, e, g}

If f,g and h are differentiable functions of x and Delta = |{:(f , g , h), ((xf)' , (xg)' , (xh)'), ((x^(2) f)'' , (x^(2) g)'', (x^(2) h)''):}| then prove that Delta'=|{:(f , g , h), (f' , g' , h'), ((x^(3) f'')' , (x^(3) g'')', (x^(3) h)'')':}| .

If f and g are real functions defined by f(x)= x^(2) + 7 and g(x)= 3x + 5 . Then, find each of the following f((1)/(2)) xx g (14)

f(x)= x, g(x)= (1)/(x) and h(x)= f(x) g(x). If h(x) = 1 then…….