If the harmonic mean between the roots of (5 + ) x2 - bx + (8 + 2) = 0 is 4, then the value of b is
2
3
4 -
If the roots of , are in increasing geometric progression, then its common ratio is
2 : 1
3 : 1
4 : 1
6 : 1
If a complex number z satisfied , then z lies on
the real axis
the imaginary axis
y = x
a circle
The origin is translated to (1, 2). The point(7, 5) in the old system undergoes the following transformations successively.
I. Moves to the new point under the given translation of origin.
II. Translated through 2 units along the negative direction of the new X-axis.
III. Rotated through an angle - about the 4 origin of new system in the clockwise direction. The final position of the point (7, 5) is
C.
Under the translation of origin to (1, 2) the point (7, 5) undergoes to (7 - 1, 5 - 2) = (6, 3) Under the translation through 2 units along the negative direction of the new x-axis, the point (6, 3) undergoes to (6, - 2, 3) = (4, 3) Under the rotation throw an angle about the the origin of new system in the clockwtse direction,the final position of point (7, 5)