Prove by mathematical induction that, for n ≥ 1, 2 − 6 + 18 − 54 + … + 2(−3)^{n−1} = − rac{1 − (−3)^{n}}{2}. The diagram shows the graph y = −rac{x}{x^{2} + 1}, for all real x. Consider the function f(x) = −rac{x}{x^{2} + 1}, for x ≥ 1. The function f(x) has an inverse. (Do NOT prove this.) (i) State the domain and range of f^{−1}(x). (ii) Sketch the graph y = f^{−1}(x). (iii) Find an expression for f^{−1}(x).

SSCE HSC Mathematics Extension 1 Differentiation of inverse trigonometric functions: Prove by mathematical induction

Prove by mathematical induction that, for n ≥ 1, 2 − 6 + 18 − 54 + … + 2(−3)^{n−1} = − rac{1 − (−3)^{n}}{2} - HSC - SSCE Mathematics Extension 1 - Question 13 - 2018 - Paper 1

Question 13

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Prove by mathematical induction that, for n ≥ 1, 2 − 6 + 18 − 54 + … + 2(−3)^{n−1} = − rac{1 − (−3)^{n}}{2}. The diagram shows the graph y = −rac{x}{x^{2} + 1}... show full transcript

Worked Solution & Example Answer:Prove by mathematical induction that, for n ≥ 1, 2 − 6 + 18 − 54 + … + 2(−3)^{n−1} = − rac{1 − (−3)^{n}}{2} - HSC - SSCE Mathematics Extension 1 - Question 13 - 2018 - Paper 1

Step 1

Prove by mathematical induction that, for n ≥ 1, 2 − 6 + 18 − 54 + … + 2(−3)^{n−1} = −\frac{1 − (−3)^{n}}{2}.

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Answer

To prove the statement by induction, we proceed as follows:

Base Case (n=1): For n=1:

LHS = 2

RHS = −\frac{1 − (−3)^{1}}{2} = −\frac{1 + 3}{2} = 2

Thus, LHS = RHS, so the base case holds.

Induction Hypothesis: Assume the statement holds for n = k, i.e., 2 − 6 + 18 − 54 + ... + 2(−3)^{k−1} = −\frac{1 − (−3)^{k}}{2}.

Induction Step: We need to show that it holds for n = k + 1:

LHS = 2 − 6 + 18 − 54 + ... + 2(−3)^{k−1} + 2(−3)^{k} = −\frac{1 − (−3)^{k}}{2} + 2(−3)^{k}.

Combining terms yields:

LHS = −\frac{1 − (−3)^{k}}{2} + 2(−3)^{k} = −\frac{1 − (−3)^{k}}{2} + \frac{4(−3)^{k}}{2} = −\frac{1 + 3^{k + 1}}{2}.

RHS = −\frac{1 − (−3)^{k+1}}{2}.

Since LHS = RHS, this completes the proof by induction.

Step 2

State the domain and range of f^{−1}(x).

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Answer

Domain of f^{−1}(x):

The domain of f^{−1}(x) corresponds to the range of f(x), which is all real numbers such that 0 < y < rac{1}{2}.

Range of f^{−1}(x):

The range of f^{−1}(x) corresponds to the domain of f(x), specifically all real numbers x ≥ 1.

Step 3

Sketch the graph y = f^{−1}(x).

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Answer

To sketch the graph of y = f^{−1}(x):

Mark critical points based on the information obtained from the domain and range.
The graph will reflect the inverse relationship, hence it will be symmetric with respect to the line y = x.
Begin the sketch at the point (1, −rac{1}{2}) and maintain the overall shape as guided by the properties of the original function.

Step 4

Find an expression for f^{−1}(x).

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Answer

To find the expression for f^{−1}(x), start with:

Set y = f(x) = −\frac{x}{x^{2} + 1}.
Solve for x in terms of y:

Multiply both sides by (x^{2} + 1) to obtain:

(y(x^{2} + 1) = -x)

Rearranging gives:

(yx^{2} + x + y = 0)

Solve this quadratic equation for x using the quadratic formula:

(x = \frac{-1 \pm \sqrt{1 - 4y^{2}}}{2y})

Choose the appropriate sign to ensure x ≥ 1. This gives a valid expression for f^{−1}(x).

Prove by mathematical induction that, for n ≥ 1, 2 − 6 + 18 − 54 + … + 2(−3)^{n−1} = − rac{1 − (−3)^{n}}{2} - HSC - SSCE Mathematics Extension 1 - Question 13 - 2018 - Paper 1

Worked Solution & Example Answer:Prove by mathematical induction that, for n ≥ 1, 2 − 6 + 18 − 54 + … + 2(−3)^{n−1} = − rac{1 − (−3)^{n}}{2} - HSC - SSCE Mathematics Extension 1 - Question 13 - 2018 - Paper 1

Prove by mathematical induction that, for n ≥ 1, 2 − 6 + 18 − 54 + … + 2(−3)^{n−1} = −\frac{1 − (−3)^{n}}{2}.

State the domain and range of f^{−1}(x).

Sketch the graph y = f^{−1}(x).

Find an expression for f^{−1}(x).

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