Let `g(x)=int_0^x(3t^(2)+2t+9)dt and f(x) ` be a decreasing function `forallxge0` such that `AB=f(x)hat(i)+g(x)hat(j) and AC=g(x)hat(i)+f(x)hat(j)` are the two smallest sides of a triangle ABC whose circumcentre lies outside the triangle `forall cgto.` Q. Which of the following is true (for `xgeo)`

Let g(x)=int_0^x(3t^(2)+2t+9)dt and f(x) be a decreasing function forallxge0 such that AB=f(x)hat(i)+g(x)hat(j) and AC=g(x)hat(i)+f(x)hat(j) are the two smallest sides of a triangle ABC whose circumcentre lies outside the triangle forall cgt 0. Q. Which of the following is true (for xgeo)

Let g(x)=int_0^x(3t^(2)+2t+9)dt and f(x) be a decreasing function forallxge0 such that AB=f(x)hat(i)+g(x)hat(j) and AC=g(x)hat(i)+f(x)hat(j) are the two smallest sides of a triangle ABC whose circumcentre lies outside the triangle forall cgto. Q. lim_(t to0)lim_(xtoinfty)(cos((pi)/(4)(1-t^(2)))^(f(x)g(x)))

If the vectors vec(A) B = 3 hat(i)+4 hat (k) and vec(AC) = 5 hat(i)-2 hat(j)+4hat(k) are the sides of a triangle ABC, then the length of the median through A is

If 3hat(i)-2hat(j)+8hat(k) and 2hat(i)+xhat(j)+hat(k) are at right angles then x=

The vectors vec AB=3hat i+4hat k and vec AC=5hat i-2hat j+hat k are the sides of a triangle ABC.The length of the median through A is -

( The vector )/(AB)=3hat i+4hat k and bar(AC)=5hat i-2hat j+4hat k are the sides of a triangle ABC.The length of the median through A is

Find the values of 'x' and 'y' so that vectors 2hat(i)+3hat(j) and x hat(i)+y hat(j) are equal.

Show that If vec(a)=x hat(i)+2hat(j)-z hat(k) and vec(b)=3hat(i)-y hat(j)+hat(k) are two equal vectors, then x+y+z=0 .

Let f(x) be a derivable function satisfying f(x)=int_(0)^(x)e^(t)sin(x-t)dt and g(x)=f'(x)-f(x) Then the possible integers in the range of g(x) is