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Unit 2: Derivatives Instructions There are 16 questions in this Assessment Opportunity. Show all work for each question. 1. Find the derivative of the following.
Unit 2: Derivatives Instructions There are 16 questions in this Assessment Opportunity. Show all work for each question. 1. Find the derivative of the following. a. f(x) =13x* -7x +5x' +11x+75 b. f(x)-(x'+ 2x'+4)(x' -3) c. f(x)= 3x -6x+7 4x-1 d. (x)=4x3-7x) e. 12- y + x t. f x) = 156 g. /(x) - (1-3x)(x' -2)'TVO ILC MCV4U Unit 2 Assessment Opportunity 2. Evaluate f"(x) for / (x) -(3x2-7x+4)" 3. Find the third derivative of f (x) =12x"-3x7+4x*+5x3+6 4. Find the equation of the tangent line to the curve y= x* -2x+3 at the point (2,3). 5. Find the point on the parabola y = -x + 3x + 4 where the slope of the tangent line is 5. 6. Give one example of a rate that is decreasing and one example of a rate that is increasing- 7. When a vehicle is said to be travelling at -35 km/h, what does this infer? dv 8. If V represents the volume of an object, what does de represent?9. A construction worker accidently drops a hammer from a height of 90 m while working on the roof of a new apartment building. The height, s, in metres, of the hammer after t seconds can be modelled by the function s (c)=90-4.9, c>0. a. Determine the velocity at 1 s and 4 s. b. When will the hammer hit the ground? c. Determine the impact velocity of the hammer. 10. The motion of a particle is described by the position function s(t) = 213-15t' +33t+17, t> ( , where r is measured in seconds and s() in metres. a. When is the particle at rest? b. When is the velocity positive? c) Draw a diagram to illustrate the motion of the particle in the first 10 seconds. d) Find the total distance traveled in the first 10 seconds. 11. A snowball melts so that its surface area decreases at a rate of 0.5 cm /min. Find the rate at which the radius decreases when the radius is 4 cm. SA = 4xr)12. Brent is driving west at 60 km/h and Aaron is driving south at 70 km/h. Both cars are approaching the intersection of the two roads. At what rate is the distance between the cars decreasing when Brent's car is 0.4 km and Aaron's is 0.3 km from the intersection? 13. A water tank at a filtration plant is built in the shape of an inverted cone with height 5.2 m and diameter 5 m at the top. Water is being pumped into the tank at a rate of 1.2 my/min. Find the rate at which the water level is rising when there is 871 m' of water. (4 marks) 14. For the function / (x) = ax +bx -5x+9 , determine the values of a and b so that ((-1)= 12 and f (-1) =3 . 15. Determine the equations of two lines that pass through the point (-1.-3) and are tangent to the graph of y =x*+1. 16. Two particles have positions at time t given by s, =4/ -/ and s, = 5 -7. Find the velocities v, and v, at the instant the accelerations of the two particles are equal
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