The reflection of the point `(t - 1,2t+ 2)` in a line is `(2t + 1,t)`, then the equation of the line has slope equals to

If x=t^(2) and y=2t then equation of the normal at t=1 is

Find the locus of the point (t^(2)-t+1,t^(2)+t+1),t in R

A, B, C are respectively the points (1,2), (4, 2), (4, 5). If T_(1), T_(2) are the points of trisection of the line segment BC, the area of the quadriateral T_(1)S_(1)S_(2)T_(2) is

let the point B be the reflection of the point A(2,3) with respect to the line 8x-6y-23=0. let T_(A) and T_(B) be circles of radii 2 and 1 with centres A and B respectively. Let T be a common tangent to the circles T_(A) and T_(B) such that both the circles are on the same side of T . if C is the point of intersection of T and the line passing through A and B then the length of the line segment AC is

In accordance to Arrhenius equation, the plot of log k against (1)/(T) is a straight line. The slope of the line is equal to

If the normal to the rectangular hyperbola xy=c^(2) at the point t' meets the curve again at t_(1) then t^(3)t_(1), has the value equal to

For a first order reaction, the plot of log k against 1/T is a straight line. The slope of the line is equal to

If the line (x-1)/(2)=(y-2)/(3)=t intersects the line x+ y=8,then t is