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Hifumi's Study Notes📕Cegep 1MathematicsRelated Rates

Related Rates

Tags
Cegep1
Mathematics
Word count
747 words
Reading time
5 minutes

Problem where one rate depends on another

Steps

  1. Draw the situation.
  2. Establish the equation that relates the quantities of interest.
  3. Implicitly differentiate the equation with respect to t.
  4. Substitute the given information and solve for the rate.

Examples

Two people on bikes are separated by 350 meters horizontally. Person A starts riding north at a rate of 5 m/sec and 7 minutes later Person B starts riding south at 3 m/sec. At what rate is the distance separating the two people changing 25 minutes after Person A starts riding?

300

After 25 mins:

y=31860=3240mz=52560=7500mx=3502+(3240+7500)2=10745.7015m

We have

x2=3502+(y+z)2ddtx2=ddt(3502+(y+z)2)2xx=2(y+z)(y+z)x=(y+z)(y+z)x=(3240+7500)(3+5)10745.70157.9958ms

A plane flying with a constant speed of 29 km/min passes over a ground radar station at an altitude of 11 km and climbs at an angle of 35 degrees. At what rate is the distance from the plane to the radar station increasing 3 minutes later?

d=(cos35°x)2+(11+sin35°x)2dddt=ddt(cos35°x)2+(11+sin35°x)2=12((cos35°x)2+(11+sin35°x)2)12(2(cos35°x)cos35°x+2(11+sin35°x)sin35°x)=12((cos35°329)2+(11+sin35°329)2)12(2(cos35°329)cos35°29+2(11+sin35°329)sin35°29)28.8657kmmin

Two parallel sides of a rectangle are being increased at a rate of 2 cm per second while the other 2 sides are being shortened so that the area remains constant at 50cm2.
(a) What is the rate of change of the perimeter when the length of an increasing side is 5 cm?
(b) What are the dimensions at the instant when the perimeter stops decreasing?

We know that

xy=50(1)P=2x+2y(2)

Using (1),

y=50x

Using (2),

P=2x+2(50x)=2x+100x

Then,

ddtP=ddt(2x+100x)P=2x100x2x

When x=5 and x=2,

P=22100522=4cms

(b) we want x and y when P=0.

P=02x100x2x=02100x2=02x2=100x=52

Note that x>0.

052
P'-+
Pdecinc

So, P stops decreasing when x=52.
By (1),

52y=50y=52

A rain gutter is to be constructed from a sheet of metal of width 30 cm bending up one third of the sheet on each side through an angle of 𝜃 . Find 𝜃 so the gutter will carry the maximum amount of water.

Note that

{A=(B+b)h2h=sinθ10b=10B=10+cosθ10

Using the above equations,

A(θ)=(10+cosθ10+10)sinθ102=100(1+cosθ)sinθ

As the sides close down, an equilateral triangle is formed.
So,

θmax=π2+π6=2π3θ[0,2π3]

Then,

A(θ)=100(sinθsinθ+(1+cosθ)cosθ)=100(cos2θ1+cosθ+cos2θ)=100(2cos2θ+cosθ1)

A is never undefined. A=0 if

2cos2θ+cosθ1=02cos2θ+2cosθcosθ1=02cosθ(cosθ+1)(cosθ+1)=0(2cosθ1)(cosθ+1)=02cosθ1=0 or cosθ+1=02cosθ=1cosθ=1cosθ=12θ=πθ=π3 or 5π3

Only π3[0,2π3]. Then,

0π32π3
A'+-
Aincdec

By the first derivative test, A(θ) is maximized when θ=π3.

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