Find the locus of a point whose coordinate are given by `x = t+t^(2), y = 2t+1`, where t is variable.

The locus of the moving point whose coordinates are given by (e^t+e^(-t),e^t-e^(-t)) where t is a parameter, is x y=1 (b) x+y=2 x^2-y^2=4 (d) x^2-y^2=2

The locus of the moving point whose coordinates are given by (e^t+e^(-t),e^t-e^(-t)) where t is a parameter, is x y=1 (b) x+y=2 x^2-y^2=4 (d) x^2-y^2=2

The locus of the moving point whose coordinates are given by (e^t+e^(-t),e^t-e^(-t)) where t is a parameter, is (a) x y=1 (b) x+y=2 (c) x^2-y^2=4 (d) x^2-y^2=2

The locus of the moving point whose coordinates are given by (e^t+e^(-t),e^t-e^(-t)) where t is a parameter, is (a) x y=1 (b) x+y=2 (c) x^2-y^2=4 (d) x^2-y^2=2

The locus of the moving point whose coordinates are given by (e^t-e^(-t),e^t+e^(-t)) where t is a parameter, is (a) x y=1 (b) y+x=2 (c) y^2-x^2=4 (d) y^2-x^2=2

The locus of the moving point whose coordinates are given by (e^(t)+e^(-t),e^(t)-e^(-t)) where t is a parameter,is xy=1 (b) x+y=2x^(2)-y^(2)=4(d)x^(2)-y^(2)=2

The x and y coordinates of a particle at any time t are given by x = 2t + 4t^2 and y = 5t , where x and y are in metre and t in second. The acceleration of the particle at t = 5 s is

The x and y coordinates of a particle at any time t are given by x = 2t + 4t^2 and y = 5t , where x and y are in metre and t in second. The acceleration of the particle at t = 5 s is