1.
1. Solve the inequality
[4]
(nov2003)
2. Given that
= 1 and
Hence determine the values of
, obtain two linear equations in
and .
and .
[4]
(june2004)
3. Solve the inequality
[4]
(nov2004)
4. (a) Given the function
, state
(i)
the coordinates of the turning point,
[1]
(ii)
the nature of the turning point.
[1]
(b) Given that the equation
+
= 11 is solved by using the
substitution
(i)
reduce the equation to a quadratic in
(ii)
hence solve the original equation.
5. Solve the inequality
[3]
[3]
(nov2004)
[4]
(june2005)
1. Solve the inequality │
│
.
2. Find the exact value of the solution to the equation
1.
[3]
[3]
(a)
Solve the inequality
[3]
(b)
Solve the equation
[4]
(june2009)
1. Express
Find the value of
in partial fractions.
[4]
which satisfies the equation
[5]
Express
in partial fractions.
Solve the following equations
(a)
(b)
[5]
[5]
[3]