2025 WAEC Mathematics Theory PART ONE a. Factorize: px - 2qx - 4qy + 2py b. Given that the universal...

PART ONE

a. Factorize: px - 2qx - 4qy + 2py

b. Given that the universal set U = {1,2,3,4,5,6,7,8,9,10}, P = {1,2,4,6,10} and Q = {2,3,6,9}. Show that (P ∪ Q)\(^I\) = P\(^I\) ∩ Q\(^I\).

a. px - 2qx - 4qy + 2py = x(p - 2q) - 2y(2q - p) = x(p - 2q) + 2y(p - 2q) = (x + 2y)(p - 2q)

b. U = {1,2,3,4,5,6,7,8,9,10}

P = {1,2,4,6,10}

Q = {2,3,6,9}

(P ∪ Q) = {1,2,3,4,6,9,10}

(P ∪ Q)\(^I\) = Elements in U but not in (P ∪ Q)

(P ∪ Q)\(^I\) = {5,7,8}

P\(^I\) = {3,5,7,8,9}

Q\(^I\) = {1,4,5,7,8,10}

P\(^I\) ∩ Q\(^I\) = {5,7,8}

Evidently, (P ∪ Q)\(^I\) = P\(^I\) ∩ Q\(^I\)

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