Explanation

a. y = c + k(\(\frac{1}{x^2}\)) where c and k are constant

b. when x = 1, y = 11

 ∴ 11 = c + k(\(\frac{1}{x^2}\)) = > 11 = c + k   --- eqn (I)

when x = 2, y = 5

 ∴ 5 = c + k(\(\frac{1}{x^2}\)) = > 5 = c + k\(\frac{1}{2^2}\)   --- eqn (II)

Multiply through by 4)             20 = 4c + k   - - - - - - -  -(III)

11 = c + k   --- eqn (I)

20 = 4c + k  - - - - - - (III)

From eqn(I) k = 11 - c

Put k = 11 - c into eqn(III)

20 = 4c + k = 20 = 4c + 11 - c

20 = 3c + 11

3c = 20 - 11 = 9

3c = 9

c = 3.

Put c = 3 into eqn(I)

11 = c + k

11 = 3 + k

k = 11 - 3 = 8

 ∴ c = 3, k = 8.

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