Extra Practice Related Ratesap Calculus
2021年4月26日Download here: http://gg.gg/udri5
4.1: Related Rates Exercises
*2.8 Related Rates Brian E. Veitch 2.8 Related Rates The related rates section is a word problem section using implicit functions. Most of the functions in this section are functions of time t. It’s probably best demonstrated through example. A stone is dropped into a pool of water. A circular ripple spreads out in the pool.
*AP Calculus Unit #4-Applications of the Derivative Part I Smac Key.pdf Author: sean.mcconnell Created Date: 12/5/2018 12:55:12 PM.
*Practice Problems for Related Rates - AP Calculus BC 1. A circular plate of metal is heated in an oven, its radius increases at a rate of 0.01 cm/min. At what rate is the area of the plate increasing when the radius is 50 cm? Two commercial jets at 40,000 ft are flying at 520 mi/hr along straight line courses that cross at right angles.
Calculus 1500 Related Rates page 1 1. An airplane is flying towards a radar station at a constant height of 6 km above the ground. If the distance s between the airplane and the radar station is decreasing at a rate of 400 km per hour when s 10 Ian., what is the horizontal speed of the plane? A light is on the ground 20 m from a building. Extra Practice Related Rates Related Rates Extra Practice. Powered by Create your own unique website with customizable templates.
For the following exercises, find the quantities for the given equation.
1) Find (frac{dy}{dt}) at (x=1) and (y=x^2+3) if (frac{dx}{dt}=4.)Answer:(8)
2) Find (frac{dx}{dt}) at (x=−2) and (y=2x^2+1) if (frac{dy}{dt}=−1.)
3) Find (frac{dz}{dt}) at ((x,y)=(1,3)) and (z^2=x^2+y^2) if (frac{dx}{dt}=4) and (frac{dy}{dt}=3).Answer:(frac{13}{sqrt{10}})
For the following exercises, sketch the situation if necessary and used related rates to solve for the quantities.
4) [T] If two electrical resistors are connected in parallel, the total resistance (measured in ohms, denoted by the Greek capital letter omega, (Ω)) is given by the equation (frac{1}{R}=frac{1}{R_1}+frac{1}{R_2}.) If (R_1) is increasing at a rate of (0.5Ω/min) and (R_2) decreases at a rate of (1.1Ω/min), at what rate does the total resistance change when (R_1=20Ω) and (R_2=50Ω/min)?
5) A 10-ft ladder is leaning against a wall. If the top of the ladder slides down the wall at a rate of 2 ft/sec, how fast is the bottom moving along the ground when the bottom of the ladder is 5 ft from the wall?Answer:(2sqrt{3} ft/sec)
6) A 25-ft ladder is leaning against a wall. If we push the ladder toward the wall at a rate of 1 ft/sec, and the bottom of the ladder is initially (20ft) away from the wall, how fast does the ladder move up the wall (5sec) after we start pushing?
7) Two airplanes are flying in the air at the same height: airplane A is flying east at 250 mi/h and airplane B is flying north at (300mi/h.) If they are both heading to the same airport, located 30 miles east of airplane A and 40 miles north of airplane B, at what rate is the distance between the airplanes changing?Answer:The distance is decreasing at (390mi/h.)
8) You and a friend are riding your bikes to a restaurant that you think is east; your friend thinks the restaurant is north. You both leave from the same point, with you riding at 16 mph east and your friend riding 12 mph north. After you traveled 4 miles, at what rate is the distance between you changing?
9) Two buses are driving along parallel freeways that are (5mi) apart, one heading east and the other heading west. Assuming that each bus drives a constant (55mph), find the rate at which the distance between the buses is changing when they are (13mi) part, heading toward each other.Answer:The distance between them shrinks at a rate of (frac{1320}{13}≈101.5mph.)
10) A 6-ft-tall person walks away from a 10-ft lamppost at a constant rate of (3ft/sec.) What is the rate that the tip of the shadow moves away from the pole when the person is 10ft away from the pole?
11)Using the previous problem, what is the rate at which the tip of the shadow moves away from the person when the person is 10 ft from the pole?Answer:(frac{9}{2} ft/sec)
12) A 5-ft-tall person walks toward a wall at a rate of 2 ft/sec. A spotlight is located on the ground 40 ft from the wall. How fast does the height of the person’s shadow on the wall change when the person is 10 ft from the wall?Extra Practice Related Ratesap Calculus 2nd Edition
13) Using the previous problem, what is the rate at which the shadow changes when the person is 10 ft from the wall, if the person is walking away from the wall at a rate of 2 ft/sec?Extra Practice Related Ratesap Calculus 14th EditionAnswer:It grows at a rate (frac{4}{9}) ft/sec
14) A helicopter starting on the ground is rising directly into the air at a rate of 25 ft/sec. You are running on the ground starting directly under the helicopter at a rate of 10 ft/sec. Find the rate of change of the distance between the helicopter and yourself after 5 sec.
15) Using the previous problem, what is the rate at which the distance between you and the helicopter is changing when the helicopter has risen to a height of 60 ft in the air, assuming that, initially it was 30 ft above you?Answer:The distance is increasing at ((frac{135sqrt{26})}{26}) ft/sec
For the following exercises, draw and label diagrams to help solve the related-rates problems.
16)The side of a cube increases at a rate of (frac{1}{2}) m/sec. Find the rate at which the volume of the cube increases when the side of the cube is 4 m.
17) The volume of a cube decreases at a rate of (10) m/sec. Find the rate at which the side of the cube changes when the side of the cube is 2 m.Answer:(−frac{5}{6}) m/sec
18) The radius of a circle increases at a rate of (2) m/sec. Find the rate at which the area of the circle increases when the radius is 5 m.
19) The radius of a sphere decreases at a rate of (3) m/sec. Find the rate at which the surface area decreases when the radius is 10 m.Answer:(240π m^2/sec)
20) The radius of a sphere increases at a rate of 1 m/sec. Find the rate at which the volume increases when the radius is (20) m.
21) The radius of a sphere is increasing at a rate of 9 cm/sec. Find the radius of the sphere when the volume and the radius of the sphere are increasing at the same numerical rate.Answer:(frac{1}{2sqrt{π}}) cm
22) The base of a triangle is shrinking at a rate of 1 cm/min and the height of the triangle is increasing at a rate of 5 cm/min. Find the rate at which the area of the triangle changes when the height is 22 cm and the base is 10 cm.
23) A triangle has two constant sides of length 3 ft and 5 ft. The angle between these two sides is increasing at a rate of 0.1 rad/sec. Find the rate at which the area of the triangle is changing when the angle between the two sides is (π/6.)Answer:The area is increasing at a rate (frac{(3sqrt{3})}{8}ft_2/sec.)
24) A triangle has a height that is increasing at a rate of 2 cm/sec and its area is increasing at a rate of 4 (cm^2/sec). Find the rate at which the base of the triangle is changing when the height of the triangle is 4 cm and the area is 20 (cm^2).
For the following exercises, consider a right cone that is leaking water. The dimensions of the conical tank are a height of 16 ft and a radius of 5 ft.
25) How fast does the depth of the water change when the water is 10 ft high if the cone leaks water at a rate of 10 (ft^3/min)?Answer:The depth of the water decreases at (frac{128}{125π}) ft/min.
26 ) ****Extra Credit for THQ4****Find the rate at which the surface area of the water changes when the water is 10 ft high if the cone leaks water at a rate of 10 (ft^3/min).
27) If the water level is decreasing at a rate of 3 in./min when the depth of the water is 8 ft, determine the rate at which water is leaking out of the cone.Answer:The volume is decreasing at a rate of (frac{(25π)}{16}ft^3/min.)
28) A vertical cylinder is leaking water at a rate of 1 (ft^3/sec). If the cylinder has a height of 10 ft and a radius of 1 ft, at what rate is the height of the water changing when the height is 6 ft?
29) A cylinder is leaking water but you are unable to determine at what rate. The cylinder has a height of 2 m and a radius of 2 m. Find the rate at which the water is leaking out of the cylinder if the rate at which the height is decreasing is 10 cm/min when the height is 1 m.Answer:The water flows out at rate (frac{(2π)}{5}m_3/min.)
30) A trough has ends shaped like isosceles triangles, with width 3 m and height 4 m, and the trough is 10 m long. Water is being pumped into the trough at a rate of (5m^3/min). At what rate does the height of the water change when the water is 1 m deep?
31) A tank is shaped like an upside-down square pyramid, with base of 4 m by 4 m and a height of 12 m (see the following figure). How fast does the height increase when the water is 2 m deep if water is being pumped in at a rate of (frac{2}{3}) m/sec?Answer:(frac{3}{2} m/sec)
For the following problems, consider a pool shaped like the bottom half of a sphere, that is being filled at a rate of 25 (ft^3)/min. The radius of the pool is 10 ft.
32) Find the rate at which the depth of the water is changing when the water has a depth of 5 ft.
33) Find the rate at which the depth of the water is changing when the water has a depth of 1 ft. What is the best open text editor for big files on mac.Answer:(frac{25}{19π} ft/min)
34) If the height is increasing at a rate of 1 in./sec when the depth of the water is 2 ft, find the rate at which water is being pumped in.
35) Gravel is being unloaded from a truck and falls into a pile shaped like a cone at a rate of 10 (ft^3/min). The radius of the cone base is three times the height of the cone. Find the rate at which the height of the gravel changes when the pile has a height of 5 ft.Answer:(frac{2}{45π} ft/min)
36) Using a similar setup from the preceding problem, find the rate at which the gravel is being unloaded if the pile is 5 ft high and the height is increasing at a rate of 4 in./min.
For the following exercises, draw the situations and solve the related-rate problems.
37) You are stationary on the ground and are watching a bird fly horizontally at a rate of (10) m/sec. The bird is located 40 m above your head. How fast does the angle of elevation change when the horizontal distance between you and the bird is 9 m?Extra Practice Related Ratesap Calculus AlgebraAnswer:The angle decreases at (frac{400}{1681}rad/sec.)
38) You stand 40 ft from a bottle rocket on the ground and watch as it takes off vertically into the air at a rate of 20 ft/sec. Find the rate at which the angle of elevation changes when the rocket is 30 ft in the air.
39) A lighthouse, L, is on an island 4 mi away from the closest point, P, on the beach (see the following image). If the lighthouse light rotates clockwise at a constant rate of 10 revolutions/min, how fast does the beam of light move across the beach 2 mi away from the closest point on the beach?Answer:(100π/min)
40)Using the same setup as the previous problem, determine at what rate the beam of light moves across the beach 1 mi away from the closest point on the beach.
41) You are walking due north to a bus stop at a right-angled corner. You are moving north at a rate of 2 m/sec. The bus travels west at a rate of 10 m/sec away from the intersection – you have missed the bus! What is the rate at which the angle between your north trajectory and your line of sight to the bus is changing when you are 20 m south of the intersection and the bus is 10 m west of the intersection?Answer:The angle is changing at a rate of (frac{11}{25}rad/sec).
For the following exercises, refer to the figure of baseball diamond, which has sides of 90 ft.
42) [T] A batter hits a ball toward third base at 75 ft/sec and runs toward first base at a rate of 24 ft/sec. At what rate does the distance between the ball and the batter change when 2 sec have passed?
43) [T] A batter hits a ball toward second base at 80 ft/sec and runs toward first base at a rate of 30 ft/sec. At what rate does the distance between the ball and the batter change when the runner has covered one-third of the distance to first base? (Hint: Recall the law of cosines.)Answer:The distance is increasing at a rate of (62.50) ft/sec.
44) [T] A batter hits the ball and runs toward first base at a speed of 22 ft/sec. At what rate does the distance between the runner and second base change when the runner has run 30 ft?
45) [T] Runners start at first and second base. When the baseball is hit, the runner at first base runs at a speed of 18 ft/sec toward second base and the runner at second base runs at a speed of 20 ft/sec toward third base. How fast is the distance between runners changing 1 sec after the ball is hit?Answer:The distance is decreasing at a rate of (11.99) ft/sec.
This video lesson explores the concept of Related Rates, which is the study of what is happening over time.
To solve problems with Related Rates, we will need to know how to differentiate implicitly, as most problems will be formulas of one or more variables.
But this time we are going to take the derivative with respect to time, t, so this means we will multiply by a differential for the derivative of every variable!
But don’t let this confused you, as there are only four basic steps when problem-solving with Related Rates:
*Write down every given information or quantity, even what you’re looking for, and make a sketch.
*Determine the equation needed to solve for your unknown quantity.
*Take the derivative implicitly, not forgetting to multiply by your differential for every single variable!
*Plug in all of your given information or quantities and solve.
And here’s a big hint…
…most of the time all we have to do is find an equation that relates the rate we’re looking for to a rate that we already know, as Paul’s Online Notes so nicely states.Extra Practice Related Ratesap Calculus Calculator
This means we need to look for geometric shapes, known formulas, and ratios.
Ladder Sliding Down a Wall
Together we will solve these 8 classic questions:
*Pebble Dropped In Pond
*Air Being Pumped Into A Balloon
*Edges Of Cube Expanding
*Radar Tracking Station & Airplane Flight Path
*Sand Falling onto a Conical Pile
*Water Pouring into a Conical Tank
*Boat Pulled into a Dock
*Ladder Sliding Down a WallHow to Solve Related Rates – Video
1 hr 35 min
*Overview of Related Rates + Tips to Solve Them
*00:02:58 – Increasing Area of a Circle
*00:12:30 – Expanding Volume of a Sphere
*00:21:15 – Expanding Volume of a Cube
*00:26:32 – Calculate the Speed of an Airplane
*00:39:13 – Conical Sand Pile
*00:51:19 – Conical Water Tank
*00:59:59 – Boat & Winch
*01:09:13 – Ladder Sliding Down A WallRelated Rates
Related Rates – 2 Examples
Get access to 6 more examples and over 150 HD videos with your subscription
Monthly, Half-Yearly, and Yearly Plans Available
Not yet ready to subscribe? Take Calcworkshop for a spin with our FREE limits course
Download here: http://gg.gg/udri5
https://diarynote-jp.indered.space
4.1: Related Rates Exercises
*2.8 Related Rates Brian E. Veitch 2.8 Related Rates The related rates section is a word problem section using implicit functions. Most of the functions in this section are functions of time t. It’s probably best demonstrated through example. A stone is dropped into a pool of water. A circular ripple spreads out in the pool.
*AP Calculus Unit #4-Applications of the Derivative Part I Smac Key.pdf Author: sean.mcconnell Created Date: 12/5/2018 12:55:12 PM.
*Practice Problems for Related Rates - AP Calculus BC 1. A circular plate of metal is heated in an oven, its radius increases at a rate of 0.01 cm/min. At what rate is the area of the plate increasing when the radius is 50 cm? Two commercial jets at 40,000 ft are flying at 520 mi/hr along straight line courses that cross at right angles.
Calculus 1500 Related Rates page 1 1. An airplane is flying towards a radar station at a constant height of 6 km above the ground. If the distance s between the airplane and the radar station is decreasing at a rate of 400 km per hour when s 10 Ian., what is the horizontal speed of the plane? A light is on the ground 20 m from a building. Extra Practice Related Rates Related Rates Extra Practice. Powered by Create your own unique website with customizable templates.
For the following exercises, find the quantities for the given equation.
1) Find (frac{dy}{dt}) at (x=1) and (y=x^2+3) if (frac{dx}{dt}=4.)Answer:(8)
2) Find (frac{dx}{dt}) at (x=−2) and (y=2x^2+1) if (frac{dy}{dt}=−1.)
3) Find (frac{dz}{dt}) at ((x,y)=(1,3)) and (z^2=x^2+y^2) if (frac{dx}{dt}=4) and (frac{dy}{dt}=3).Answer:(frac{13}{sqrt{10}})
For the following exercises, sketch the situation if necessary and used related rates to solve for the quantities.
4) [T] If two electrical resistors are connected in parallel, the total resistance (measured in ohms, denoted by the Greek capital letter omega, (Ω)) is given by the equation (frac{1}{R}=frac{1}{R_1}+frac{1}{R_2}.) If (R_1) is increasing at a rate of (0.5Ω/min) and (R_2) decreases at a rate of (1.1Ω/min), at what rate does the total resistance change when (R_1=20Ω) and (R_2=50Ω/min)?
5) A 10-ft ladder is leaning against a wall. If the top of the ladder slides down the wall at a rate of 2 ft/sec, how fast is the bottom moving along the ground when the bottom of the ladder is 5 ft from the wall?Answer:(2sqrt{3} ft/sec)
6) A 25-ft ladder is leaning against a wall. If we push the ladder toward the wall at a rate of 1 ft/sec, and the bottom of the ladder is initially (20ft) away from the wall, how fast does the ladder move up the wall (5sec) after we start pushing?
7) Two airplanes are flying in the air at the same height: airplane A is flying east at 250 mi/h and airplane B is flying north at (300mi/h.) If they are both heading to the same airport, located 30 miles east of airplane A and 40 miles north of airplane B, at what rate is the distance between the airplanes changing?Answer:The distance is decreasing at (390mi/h.)
8) You and a friend are riding your bikes to a restaurant that you think is east; your friend thinks the restaurant is north. You both leave from the same point, with you riding at 16 mph east and your friend riding 12 mph north. After you traveled 4 miles, at what rate is the distance between you changing?
9) Two buses are driving along parallel freeways that are (5mi) apart, one heading east and the other heading west. Assuming that each bus drives a constant (55mph), find the rate at which the distance between the buses is changing when they are (13mi) part, heading toward each other.Answer:The distance between them shrinks at a rate of (frac{1320}{13}≈101.5mph.)
10) A 6-ft-tall person walks away from a 10-ft lamppost at a constant rate of (3ft/sec.) What is the rate that the tip of the shadow moves away from the pole when the person is 10ft away from the pole?
11)Using the previous problem, what is the rate at which the tip of the shadow moves away from the person when the person is 10 ft from the pole?Answer:(frac{9}{2} ft/sec)
12) A 5-ft-tall person walks toward a wall at a rate of 2 ft/sec. A spotlight is located on the ground 40 ft from the wall. How fast does the height of the person’s shadow on the wall change when the person is 10 ft from the wall?Extra Practice Related Ratesap Calculus 2nd Edition
13) Using the previous problem, what is the rate at which the shadow changes when the person is 10 ft from the wall, if the person is walking away from the wall at a rate of 2 ft/sec?Extra Practice Related Ratesap Calculus 14th EditionAnswer:It grows at a rate (frac{4}{9}) ft/sec
14) A helicopter starting on the ground is rising directly into the air at a rate of 25 ft/sec. You are running on the ground starting directly under the helicopter at a rate of 10 ft/sec. Find the rate of change of the distance between the helicopter and yourself after 5 sec.
15) Using the previous problem, what is the rate at which the distance between you and the helicopter is changing when the helicopter has risen to a height of 60 ft in the air, assuming that, initially it was 30 ft above you?Answer:The distance is increasing at ((frac{135sqrt{26})}{26}) ft/sec
For the following exercises, draw and label diagrams to help solve the related-rates problems.
16)The side of a cube increases at a rate of (frac{1}{2}) m/sec. Find the rate at which the volume of the cube increases when the side of the cube is 4 m.
17) The volume of a cube decreases at a rate of (10) m/sec. Find the rate at which the side of the cube changes when the side of the cube is 2 m.Answer:(−frac{5}{6}) m/sec
18) The radius of a circle increases at a rate of (2) m/sec. Find the rate at which the area of the circle increases when the radius is 5 m.
19) The radius of a sphere decreases at a rate of (3) m/sec. Find the rate at which the surface area decreases when the radius is 10 m.Answer:(240π m^2/sec)
20) The radius of a sphere increases at a rate of 1 m/sec. Find the rate at which the volume increases when the radius is (20) m.
21) The radius of a sphere is increasing at a rate of 9 cm/sec. Find the radius of the sphere when the volume and the radius of the sphere are increasing at the same numerical rate.Answer:(frac{1}{2sqrt{π}}) cm
22) The base of a triangle is shrinking at a rate of 1 cm/min and the height of the triangle is increasing at a rate of 5 cm/min. Find the rate at which the area of the triangle changes when the height is 22 cm and the base is 10 cm.
23) A triangle has two constant sides of length 3 ft and 5 ft. The angle between these two sides is increasing at a rate of 0.1 rad/sec. Find the rate at which the area of the triangle is changing when the angle between the two sides is (π/6.)Answer:The area is increasing at a rate (frac{(3sqrt{3})}{8}ft_2/sec.)
24) A triangle has a height that is increasing at a rate of 2 cm/sec and its area is increasing at a rate of 4 (cm^2/sec). Find the rate at which the base of the triangle is changing when the height of the triangle is 4 cm and the area is 20 (cm^2).
For the following exercises, consider a right cone that is leaking water. The dimensions of the conical tank are a height of 16 ft and a radius of 5 ft.
25) How fast does the depth of the water change when the water is 10 ft high if the cone leaks water at a rate of 10 (ft^3/min)?Answer:The depth of the water decreases at (frac{128}{125π}) ft/min.
26 ) ****Extra Credit for THQ4****Find the rate at which the surface area of the water changes when the water is 10 ft high if the cone leaks water at a rate of 10 (ft^3/min).
27) If the water level is decreasing at a rate of 3 in./min when the depth of the water is 8 ft, determine the rate at which water is leaking out of the cone.Answer:The volume is decreasing at a rate of (frac{(25π)}{16}ft^3/min.)
28) A vertical cylinder is leaking water at a rate of 1 (ft^3/sec). If the cylinder has a height of 10 ft and a radius of 1 ft, at what rate is the height of the water changing when the height is 6 ft?
29) A cylinder is leaking water but you are unable to determine at what rate. The cylinder has a height of 2 m and a radius of 2 m. Find the rate at which the water is leaking out of the cylinder if the rate at which the height is decreasing is 10 cm/min when the height is 1 m.Answer:The water flows out at rate (frac{(2π)}{5}m_3/min.)
30) A trough has ends shaped like isosceles triangles, with width 3 m and height 4 m, and the trough is 10 m long. Water is being pumped into the trough at a rate of (5m^3/min). At what rate does the height of the water change when the water is 1 m deep?
31) A tank is shaped like an upside-down square pyramid, with base of 4 m by 4 m and a height of 12 m (see the following figure). How fast does the height increase when the water is 2 m deep if water is being pumped in at a rate of (frac{2}{3}) m/sec?Answer:(frac{3}{2} m/sec)
For the following problems, consider a pool shaped like the bottom half of a sphere, that is being filled at a rate of 25 (ft^3)/min. The radius of the pool is 10 ft.
32) Find the rate at which the depth of the water is changing when the water has a depth of 5 ft.
33) Find the rate at which the depth of the water is changing when the water has a depth of 1 ft. What is the best open text editor for big files on mac.Answer:(frac{25}{19π} ft/min)
34) If the height is increasing at a rate of 1 in./sec when the depth of the water is 2 ft, find the rate at which water is being pumped in.
35) Gravel is being unloaded from a truck and falls into a pile shaped like a cone at a rate of 10 (ft^3/min). The radius of the cone base is three times the height of the cone. Find the rate at which the height of the gravel changes when the pile has a height of 5 ft.Answer:(frac{2}{45π} ft/min)
36) Using a similar setup from the preceding problem, find the rate at which the gravel is being unloaded if the pile is 5 ft high and the height is increasing at a rate of 4 in./min.
For the following exercises, draw the situations and solve the related-rate problems.
37) You are stationary on the ground and are watching a bird fly horizontally at a rate of (10) m/sec. The bird is located 40 m above your head. How fast does the angle of elevation change when the horizontal distance between you and the bird is 9 m?Extra Practice Related Ratesap Calculus AlgebraAnswer:The angle decreases at (frac{400}{1681}rad/sec.)
38) You stand 40 ft from a bottle rocket on the ground and watch as it takes off vertically into the air at a rate of 20 ft/sec. Find the rate at which the angle of elevation changes when the rocket is 30 ft in the air.
39) A lighthouse, L, is on an island 4 mi away from the closest point, P, on the beach (see the following image). If the lighthouse light rotates clockwise at a constant rate of 10 revolutions/min, how fast does the beam of light move across the beach 2 mi away from the closest point on the beach?Answer:(100π/min)
40)Using the same setup as the previous problem, determine at what rate the beam of light moves across the beach 1 mi away from the closest point on the beach.
41) You are walking due north to a bus stop at a right-angled corner. You are moving north at a rate of 2 m/sec. The bus travels west at a rate of 10 m/sec away from the intersection – you have missed the bus! What is the rate at which the angle between your north trajectory and your line of sight to the bus is changing when you are 20 m south of the intersection and the bus is 10 m west of the intersection?Answer:The angle is changing at a rate of (frac{11}{25}rad/sec).
For the following exercises, refer to the figure of baseball diamond, which has sides of 90 ft.
42) [T] A batter hits a ball toward third base at 75 ft/sec and runs toward first base at a rate of 24 ft/sec. At what rate does the distance between the ball and the batter change when 2 sec have passed?
43) [T] A batter hits a ball toward second base at 80 ft/sec and runs toward first base at a rate of 30 ft/sec. At what rate does the distance between the ball and the batter change when the runner has covered one-third of the distance to first base? (Hint: Recall the law of cosines.)Answer:The distance is increasing at a rate of (62.50) ft/sec.
44) [T] A batter hits the ball and runs toward first base at a speed of 22 ft/sec. At what rate does the distance between the runner and second base change when the runner has run 30 ft?
45) [T] Runners start at first and second base. When the baseball is hit, the runner at first base runs at a speed of 18 ft/sec toward second base and the runner at second base runs at a speed of 20 ft/sec toward third base. How fast is the distance between runners changing 1 sec after the ball is hit?Answer:The distance is decreasing at a rate of (11.99) ft/sec.
This video lesson explores the concept of Related Rates, which is the study of what is happening over time.
To solve problems with Related Rates, we will need to know how to differentiate implicitly, as most problems will be formulas of one or more variables.
But this time we are going to take the derivative with respect to time, t, so this means we will multiply by a differential for the derivative of every variable!
But don’t let this confused you, as there are only four basic steps when problem-solving with Related Rates:
*Write down every given information or quantity, even what you’re looking for, and make a sketch.
*Determine the equation needed to solve for your unknown quantity.
*Take the derivative implicitly, not forgetting to multiply by your differential for every single variable!
*Plug in all of your given information or quantities and solve.
And here’s a big hint…
…most of the time all we have to do is find an equation that relates the rate we’re looking for to a rate that we already know, as Paul’s Online Notes so nicely states.Extra Practice Related Ratesap Calculus Calculator
This means we need to look for geometric shapes, known formulas, and ratios.
Ladder Sliding Down a Wall
Together we will solve these 8 classic questions:
*Pebble Dropped In Pond
*Air Being Pumped Into A Balloon
*Edges Of Cube Expanding
*Radar Tracking Station & Airplane Flight Path
*Sand Falling onto a Conical Pile
*Water Pouring into a Conical Tank
*Boat Pulled into a Dock
*Ladder Sliding Down a WallHow to Solve Related Rates – Video
1 hr 35 min
*Overview of Related Rates + Tips to Solve Them
*00:02:58 – Increasing Area of a Circle
*00:12:30 – Expanding Volume of a Sphere
*00:21:15 – Expanding Volume of a Cube
*00:26:32 – Calculate the Speed of an Airplane
*00:39:13 – Conical Sand Pile
*00:51:19 – Conical Water Tank
*00:59:59 – Boat & Winch
*01:09:13 – Ladder Sliding Down A WallRelated Rates
Related Rates – 2 Examples
Get access to 6 more examples and over 150 HD videos with your subscription
Monthly, Half-Yearly, and Yearly Plans Available
Not yet ready to subscribe? Take Calcworkshop for a spin with our FREE limits course
Download here: http://gg.gg/udri5
https://diarynote-jp.indered.space
コメント