1998 Ce Maths Paper 2 Solution

The following suggested answers are based on common marking schemes used by educators and platforms like Scribd : C A E A E C D D C E D B B D E B B C C A E D C D D D B B C E C E A A A C B E B E B B D C E C A A A Key Solutions and Common Challenges

Solution: Using Pythagoras' theorem: c² = a² + b² => 10² = 6² + b² => 100 = 36 + b² => b² = 64 => b = 8 cm (C) 1998 ce maths paper 2 solution

( \log_4 x = \frac\log_2 x\log_2 4 = \frac\log_2 x2 ) Let ( y = \log_2 x ): ( y + y/2 = 6 ) → ( 1.5y = 6 ) → ( y = 4 ) So ( x = 2^4 = 16 ). The following suggested answers are based on common