Q1/ At what point on the curve x = 3t2 + 8, y = t3 −...

1. (1’) The position function of a particle is given by s(t) = 3t2 − t3,...

1. (1’) The position function of a particle is given by s(t) = 3t2 − t3, t ≥ 0. (a) When does the particle reach a velocity of 0 m/s? Explain the significance of this value of t. (b) When does the particle have acceleration 0 m/s2? 2. (1’) Evaluate the limit, if it exists. lim |x|/x→0 x 3. (1’) Use implicit differentiation to find an equation of the tangent line to the curve sin(x) + cos(y) = 1 at...

At what point on the curve x = 3t^2 + 1, y = t^3 − 3...

At what point on the curve x = 3t^2 + 1, y = t^3 − 3 does the tangent line have slope 1/2 ?

Find the slope of the line tangent to the curve y=x^2 at the point (-0.9,0.81) and...

Find the slope of the line tangent to the curve y=x^2 at the point (-0.9,0.81) and then find the corresponding equation of the tangent line. Find the slope of the line tangent to the curve y=x^2 at the point (6/7, 36,49) and then find the corresponding equation to the tangent line.   answer must be simplified fraction

Consider the parametric curve x = t2, y = t3 + 3t, −∞ < t <...

Consider the parametric curve x = t2, y = t3 + 3t, −∞ < t < ∞. (a) Find all of the points where the tangent line is vertical. (b) Find d2y/dx2 at the point (1, 4). (c) Set up an integral for the area under the curve from t = −2 to t = −1. (d) Set up an integral for the length of the curve from t=−1 to t=1.

(1 point) The point P(1/5,10) lies on the curve y=2/x . Let Q be the point...

(1 point) The point P(1/5,10) lies on the curve y=2/x . Let Q be the point (x,2/x). a.) Find the slope of the secant line PQ for the following values of x. If x=1.5/5, the slope of PQ is: If x=1.05/5, the slope of PQ is: If x=0.95/5, the slope of PQ is: If x=0.5/5, the slope of PQ is: Based on the above results, guess the slope of the tangent line to the curve at P(1/5,10)

1 point) Find the slope of the tangent line to the curve 3sin(x)+6cos(y)−5sin(x)cos(y)+x=5π3sin⁡(x)+6cos⁡(y)−5sin⁡(x)cos⁡(y)+x=5π at the point...

1 point) Find the slope of the tangent line to the curve 3sin(x)+6cos(y)−5sin(x)cos(y)+x=5π3sin⁡(x)+6cos⁡(y)−5sin⁡(x)cos⁡(y)+x=5π at the point (5π,5π/2)(5π,5π/2).

1 point) Find the slope of the tangent line to the curve 3sin(x)+6cos(y)−5sin(x)cos(y)+x=5π3sin⁡(x)+6cos⁡(y)−5sin⁡(x)cos⁡(y)+x=5π at the point...

1 point) Find the slope of the tangent line to the curve 3sin(x)+6cos(y)−5sin(x)cos(y)+x=5π3sin⁡(x)+6cos⁡(y)−5sin⁡(x)cos⁡(y)+x=5π at the point (5π,5π/2)(5π,5π/2).

Find the derivative of the parametric curve x=2t-3t2, y=cos(3t) for 0 ≤ ? ≤ 2?. Find...

Find the derivative of the parametric curve x=2t-3t2, y=cos(3t) for 0 ≤ ? ≤ 2?. Find the values for t where the tangent lines are horizontal on the parametric curve. For the horizontal tangent lines, you do not need to find the (x,y) pairs for these values of t. Find the values for t where the tangent lines are vertical on the parametric curve. For these values of t find the coordinates of the points on the parametric curve.

Find the equations of the tangents to the curve x = 6t2 + 6, y =...

Find the equations of the tangents to the curve x = 6t2 + 6, y = 4t3 + 4 that pass through the point (12, 8). y = (smaller slope) y = (larger slope)

Compute the x and y coordinate of the Point P(t=0.2)P(t=0.2) on the cubic B-Spline P(t)=∑nk=1PkBk,4(t)P(t)=∑k=1nPkBk,4(t) Control...

Compute the x and y coordinate of the Point P(t=0.2)P(t=0.2) on the cubic B-Spline P(t)=∑nk=1PkBk,4(t)P(t)=∑k=1nPkBk,4(t) Control Points: P1P1 = ( 3|5), P2P2 = ( 6|6), P3P3 = ( 7|10), P4P4 = ( 20|11) Use the following blending functions B0,4=16(1−3t+3t2−t3)B0,4=16(1−3t+3t2−t3) B1,4=16(4−6t2+3t3)B1,4=16(4−6t2+3t3) B2,4=16(1+3t+3t2−3t3)B2,4=16(1+3t+3t2−3t3) B3,4=16(t3)B3,4=16(t3) Px = PY= Show in steps complete calculation