3. Revision of all the exercise
Revision of theorems
Revision of all the formulae
4. At a time revise two or more chapters
Use mixed bag approach for revision
Allot fixed time for revision when your
mind is completely focused in studies
5.
6. 2 hours for 40 marks
∴
120 minutes for 40 marks
∴
3 minutes for 1 mark
7. 5 minutes
Read the question paper
10 minutes
Q.1
10 minutes
Q.2
15 minutes
Q.3
20 minutes
Q.4
25 minutes
Q.5
80 minutes
Remaining 40 minutes for extra problems
8. Minimum two papers of each (algebra
and Geometry) should be solved.
Ideal timing for writing these papers. 11
a.m. to 1 p.m.
Get these papers assessed
9.
10. Solve all the problems from the question
bank
Refer available practice book
The higher order thinking skill questions
can be asked in any question
e.g. Find sin (-300º)
11. If α and β are roots of the quadratic equation
4x2 – 5x + 2. Find the equation whose roots are
1
Sol:
and
1
4x2 – 5x + 2 = 0
∴ a = 4, b = −5, c = 2
If α and β are the roots of this
equation, then
12.
13.
14.
15. In the adjoining figure, the inscribed circle of ∆ABC with centre P, touches the sides AB, BC and AC at points L, M and N respectively. Show that
Q.
In the adjoining figure, the inscribed circle of
∆ABC with centre P, touches the sides AB, BC
and AC at points L, M and N respectively.
Show that
A
ABC
1
2
perim eter of
ABC
radius of inscribed circle
16. Construction : Join PL, PM, PN.
PL = PM = PN = r (where, r is the radius of inscribed circle)
PL ⊥ AB
PM ⊥ BC
PM ⊥ BC
Tangent radius ⊥ lar property
17. In the adjoining figure, the inscribed circle of ∆ABC with centre P, touches the sides AB, BC and AC at points L, M and N respectively. Show that
18. In the adjoining figure, the inscribed circle of ∆ABC with centre P, touches the sides AB, BC and AC at points L, M and N respectively. Show that