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Differentiation
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Finding ππ¦ ππ₯ given an equation
Usually questions will ask you to find ππ¦ ππ₯ . Just differentiate both sides of the equation with respect to π₯. Then make ππ¦ ππ₯ the subject. C4 Jan 2008 Q5 Find ππ¦ ππ₯ in terms of π₯ and π¦ when π₯ 3 +π₯+ π¦ 3 +3π¦=6 π π π +π+π π π π
π π
π +π π
π π
π =π π
π π
π π π π +π =βπ π π βπ π
π π
π =β π π π +π π π+ π π ? β512β4 π¦ 2 =β96π¦ π¦ 2 β24π¦+128=0 π¦β16 π¦β8 =0 Gives point β8,16 , β8,8 Implicitly differentiating: 3 π₯ 2 β8π¦ ππ¦ ππ₯ =12π₯ ππ¦ ππ₯ +12π¦ ππ¦ ππ₯ not needed, but itβs 3 π₯ 2 β12π¦ 12π₯+8π¦ If π₯=β8, π¦=8, ππ¦ ππ₯ =β3 If π₯=β8, π¦=16, ππ¦ ππ₯ =0 ? ?
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Differentiation You can differentiate the general power function ax where a is a constant Differentiate π¦= π π₯ where a is a constant This is important β as a is a constant it can be treated as a number π¦= π π₯ Take natural logs πππ¦= πππ π₯ Use the power law πππ¦=π₯πππ Differentiate each side ο ln a is a constant so can be thought of as just a number 1 π¦ ππ¦ ππ₯ =πππ Multiply both sides by y ππ¦ ππ₯ =π¦πππ y = ax as from the first line ππ¦ ππ₯ = π π₯ πππ 4C
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Differentiation 4C ππ¦ ππ₯ = π π₯ πππ
You can differentiate the general power function ax where a is a constant Differentiate π¦= 3 π₯ π¦= 3 π₯ Differentiate ππ¦ ππ₯ = 3 π₯ ππ3 Differentiate π¦= 6π π₯ where r is a constant π¦= 6π π₯ Differentiate ππ¦ ππ₯ = 6π π₯ πππ 4C
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Exercise 4C
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Differentiation 4D ππ΄ ππ‘ = ππ ππ‘ Γ ππ΄ ππ
You can relate one rate of change to another. This is useful when a situation involves more than two variables. Given that the area of a circle A, is related to its radius r by the formula A = Οr2, and the rate of change of its radius in cm is given by dr/dt = 5, find dA/dt when r = 3 You are told a formula linking A and r You are told the radius is increasing by 5 at that moment in time You are asked to find how much the area is increasing when the radius is 3 This is quite logical β if the radius is increasing over time, the area must also be increasing, but at a different rateβ¦ ππ΄ ππ‘ = ππ ππ‘ Γ ππ΄ ππ ππ΄ ππ‘ = ππ ππ‘ Γ ππ΄ ππ Replace dr/dt and dA/dr ππ΄ ππ‘ = 5 Γ 2ππ We are trying to work out dA/dt We have been told dr/dt in the question You need to find a derivative that will give you the dA and cancel the dr out ππ΄ ππ‘ = 10ππ r = 3 π΄=π π 2 = 30π ππ΄ ππ =2ππ Differentiate 4D
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Differentiation You can relate one rate of change to another. This is useful when a situation involves more than two variables. π= 2 3 π π 3 The volume of a hemisphere is related to its radius by the formula: The total surface area is given by the formula: π=3π π 2 ππ ππ‘ =6 Find the rate of increase of surface area when the rate of increase of volume: You need to use the information to set up a chain of derivatives that will leave dS/dt ππ ππ‘ = ππ ππ‘ ππ ππ ππ ππ Γ ππ ππ Γ Rate of change of surface area over time We are told dV/dt in the question so we will use it We have a formula linking V and r so can work out dV/dr We have a formula linking S and r so can work out dS/dr This isnβt all correct though, as multiplying these will not leave dS/dt However, if we flip the middle derivative, the sequence will work! 4D
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Differentiation You can relate one rate of change to another. This is useful when a situation involves more than two variables. π= 2 3 π π 3 The volume of a hemisphere is related to its radius by the formula: The total surface area is given by the formula: π=3π π 2 ππ ππ‘ =6 Find the rate of increase of surface area when the rate of increase of volume: You need to use the information to set up a chain of derivatives that will leave dS/dt ππ ππ‘ = ππ ππ‘ Γ ππ ππ Γ ππ ππ π= 2 3 π π 3 π=3π π 2 Sub in values Differentiate Differentiate ππ ππ‘ = Γ ππ 2 6 Γ 6ππ ππ ππ =2 ππ 2 ππ ππ =6ππ You can write as one fraction Flip to obtain the derivative we want ππ ππ‘ = 36ππ 2 ππ 2 ππ ππ = 1 2 ππ 2 Simplify ππ ππ‘ = 18 π 4D
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Exercise 4D
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Differentiation ππ ππ‘ = βππ 4E
You can set up differential equations from information given in context Differential equations can arise anywhere when variables change relative to one another In Mechanics, speed may change over time due to acceleration The rate of growth of bacteria may change when temperature is changed As taxes change, the amount of money people spend will change Setting these up involve the idea of proportion, a topic you met at GCSEβ¦ Radioactive particles decay at a rate proportional to the number of particles remaining. Write an equation for the rate of change of particlesβ¦ ο Let N be the number of particles and t be time ππ ππ‘ = βππ The rate of change of the number of particles The number of particles remaining multiplied by the proportional constant, k. ο Negative because the number of particles is decreasing 4E
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Differentiation ππ ππ‘ = ππ 4E
You can set up differential equations from information given in context A population is growing at a rate proportional to its size at a given time. Write an equation for the rate of growth of the population ο Let P be the population and t be time ππ ππ‘ = ππ The population multiplied by the proportional constant k ο Leave positive since the population is increasing The rate of change of the population 4E
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Differentiation ππ ππ‘ = βπ(πβ π 0 ) 4E
You can set up differential equations from information given in context Newtonβs law of cooling states that the rate of loss of temperature is proportional to the excess temperature the body has over its surroundings. Write an equation for this lawβ¦ Let the temperature of the body be ΞΈ degrees and time be t The βexcessβ temperature will be the difference between the objects temperature and its surroundings β ie) One subtract the other (ΞΈ β ΞΈ0) where ΞΈ0 is the temperature of the surroundings ππ ππ‘ = βπ(πβ π 0 ) The rate of change of the objects temperature The difference between temperatures (ΞΈ - ΞΈ0) multiplied by the proportional constant k ο Negative since it is a loss of temperature 4E
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Differentiation You can set up differential equations from information given in context The head of a snowman of radius r cm loses volume at a rate proportional to its surface area. Assuming the head is spherical, and that the volume V = 4/3Οr3 and the Surface Area A = 4Οr2, write down a differential equation for the change of radius of the snowmanβs headβ¦ ππ ππ‘ =βππ΄ The first sentence tells us The rate of change of volume Is the Surface Area multiplied by the proportional constant k (negative as the volume is falling) ππ ππ‘ = ππ ππ‘ ππ ππ π= 4 3 π π 3 Γ Differentiate ππ ππ =4π π 2 We want to know the rate of change of the radius r We know dV/dt We need a derivative that will leave dr/dt when cancelled Flip over ππ ππ = 1 4π π 2 4E
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Differentiation You can set up differential equations from information given in context The head of a snowman of radius r cm loses volume at a rate proportional to its surface area. Assuming the head is spherical, and that the volume V = 4/3Οr3 and the Surface Area A = 4Οr2, write down a differential equation for the change of radius of the snowmanβs headβ¦ ππ ππ‘ =βππ΄ The first sentence tells us The rate of change of volume Is the Surface Area multiplied by the proportional constant k (negative as the volume is falling) ππ ππ‘ = ππ ππ‘ ππ ππ π= 4 3 π π 3 Γ Fill in what we know Differentiate ππ ππ‘ = 1 4π π 2 ππ ππ =4π π 2 βππ΄ Γ We know A from the question Flip over ππ ππ‘ = 1 4π π 2 ππ ππ = 1 4π π 2 βπ(4π π 2 ) Γ Simplify ππ ππ‘ = βπ 4E
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Exercise 4E and Mixed 4F
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