SSCE HSC Mathematics Extension 1 Parametric form of a function or relation: Prove by mathematical induction

Question

Prove by mathematical induction that $8^{2n+1} + 6^{2n-1}$ is divisible by 7, for any integer $n e 1$.

Let $P(n)$ be the given proposition.

$P(1)$ is true since $8^2 	imes 6^0 = 7 	imes 4$ which is divisible by 7.

Let $k$ be an integer for which $P(k)$ is true. That is $8^{2k+1} + 6^{2k-1} = 7m$, for some integer $m$.

Consider $8^{2(k+1)+1} + 6^{2(k+1)-1}$:

$$8^{2(k+1)+1} + 6^{2(k+1)-1} = 8^{2k+3} + 6^{2k+1}$$

This can be rewritten as:

$$= 8^{2k+1} 	imes 8^2 + 6^{2k-1} 	imes 6^2$$

Substituting for $8^{2k+1}$ and $6^{2k-1}$ using $P(k)$, we get:

$$= 7m 	imes 64 + 7n 	imes 36$$

Which simplifies to:

$$= 7 	imes (64m + 36n)$$

Thus, $P(k+1)$ is true.

By induction, $P(n)$ holds for all $n e 1$.

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Let $P(2p,p^2)$ be a point on the parabola $x^2 = 4y$.
The tangent to the parabola at $P$ meets the parabola $x^2 = -4ay$, $a > 0$, at $Q$ and $R$. Let $M$ be the midpoint of $QR$.

(i) Show that the $x$ coordinates of $R$ and $Q$ satisfy:

$$x^2 + 4apx - 4p^2 = 0$$

(ii) Show that the coordinates of $M$ are $(-2ap,-p^2(2a+1))$.

(iii) Find the value of $a$ so that the point $M$ always lies on the parabola $x^2 = -4y$.

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The concentration of a drug in a body is $F(t)$, where $t$ is the time in hours after the drug is taken.
Initially the concentration of the drug is zero. The rate of change of concentration of the drug is given by

$$F'(t) = 50e^{-0.5t} - 0.4F(t)$$

(i) By differentiating the product $F(t)e^{0.4t}$ show that

$$rac{d}{dt}(F(t)e^{0.4t}) = 50e^{-0.1t}$$.

(ii) Hence, or otherwise, show that $F(t) = 500(e^{-0.4t}-e^{-0.5t})$.

(iii) The concentration of the drug increases to a maximum.
For what value of $t$ does this maximum occur?

Prove by mathematical induction that $8^{2n+1} + 6^{2n-1}$ is divisible by 7, for any integer $n e 1$ - HSC - SSCE Mathematics Extension 1 - Question 14 - 2017 - Paper 1

Worked Solution & Example Answer:Prove by mathematical induction that $8^{2n+1} + 6^{2n-1}$ is divisible by 7, for any integer $n e 1$ - HSC - SSCE Mathematics Extension 1 - Question 14 - 2017 - Paper 1

Prove by mathematical induction that $8^{2n+1} + 6^{2n-1}$ is divisible by 7, for any integer $n e 1$

Show that the $x$ coordinates of $R$ and $Q$ satisfy: $x^2 + 4apx - 4p^2 = 0$

Show that the coordinates of $M$ are $(-2ap,-p^2(2a+1))$

Find the value of $a$ so that the point $M$ always lies on the parabola $x^2 = -4y$

By differentiating the product $F(t)e^{0.4t}$ show that $rac{d}{dt}(F(t)e^{0.4t}) = 50e^{-0.1t}$

Hence, or otherwise, show that $F(t) = 500(e^{-0.4t}-e^{-0.5t})$

For what value of $t$ does this maximum occur?

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Prove by mathematical induction that $8^{2n+1} + 6^{2n-1}$ is divisible by 7, for any integer $n e 1$ - HSC - SSCE Mathematics Extension 1 - Question 14 - 2017 - Paper 1

Worked Solution & Example Answer:Prove by mathematical induction that $8^{2n+1} + 6^{2n-1}$ is divisible by 7, for any integer $n e 1$ - HSC - SSCE Mathematics Extension 1 - Question 14 - 2017 - Paper 1

Prove by mathematical induction that $8^{2n+1} + 6^{2n-1}$ is divisible by 7, for any integer $n e 1$