t1

If the normals at points t_(1) and t_(2) meet on the parabola,then t_(1)t_(2)=1 (b) t_(2)=-t_(1)-(2)/(t_(1))t_(1)t_(2)=2( d) none of these

The roots of the equation |{:(" "1,t-1," "1),(t-1," "1," "1),(" "1," "1,t-1):}|=0 are

The roots of the equation |(1,t-1,1),(t-1,1,1),(1,1,t-1)| = 0 are

If x=(t+1)/(t),y=(t-1)/(t)," then "(dy)/(dx)=

If x=(t+1)/(t),y=(t-1)/(t)," then: "(dy)/(dx)=

If x=(t+(1)/(t)),y=(t-(1)/(t)) , then (dy)/(dx)=?

x = t + (1)/(t), y = t - 1/t

Calculate a, T_(1), T_(2), T_(1)' & T_(2)' .