`bar(XY)` is perpendicular bisector of `bar(PQ)` then angle between `bar(XY)` and `bar(PQ)` is

Draw the perpendicular bisector of bar XY whose length is 10.3 cm Take any point P on the bisector drawn.Examine whether PX=PY.

If bar x is the mean and Mean Deviation from mean is MD (bar x) , then find the number of observations lying between bar x- MD (bar x) and bar x+ MD (bar x) from the following data : 22, 24, 30, 27, 29, 31, 25, 28, 41, 42.

Draw a circle with centre C and radius 3.4 cm.Draw any chord bar AB .Construct the perpendicular bisector of bar AB and examine if it passes through C.

Draw any angle with vertex O .Take a pont A on one of its arms and B on any another such that OA=OB.Draw the perpendicular bisectors of barOA and bar OB .Let them meet at P.Is PA=PB?

Given four non zero vectors bar a,bar b,bar c and bar d . The vectors bar a,bar b and bar c are coplanar but not collinear pair by pairand vector bar d is not coplanar with vectors bar a,bar b and bar c and hat (bar a bar b) = hat (bar b bar c) = pi/3,(bar d bar b)=beta ,If (bar d bar c)=cos^-1(mcos beta+ncos alpha) then m-n is :

The simplest form of 0.bar32 is

P and Q are two points on the curve y = 2^(x+2) in the rectangular cartesian coordinate system such that bar(OP).barC=-1 and bar(OQ).barC=2 . where barc is the unit vector along the positive direction of the x-axis. Then bar(OQ)-4bar(OP)=