Evaluate 7942 –
7842
Solution
7942 –
7842 = (794 + 784)( 794 – 784)
= (1578)( 10)
= 17780
Hence 7942 –
7842 = 17780
TRY THIS…………….
Evaluate 9012 –
8012
Friday, 1 May 2015
LOGARITHMS 1
Evaluate Log2(256 x 8).
Solution
= Log2(256 x 8)
= Log2256 + Log28
(applying the product rule)
= Log228
+ Log223 (
256= 28 and 8=23 )
= 8Log22 + 3Log22
( remember Logaac = cLogaa )
= (8 x 1) + (3 x 1)
( remember Logaa
= 1 )
= 8 + 3
= 11
hence Log2(128 x 8) = 11
TRY THIS...............
Evaluate Log2(1024 x 32).
Thursday, 30 April 2015
LOGARITHMS 21
Find x if Logx0.000001
= -6
solution
Logx0.000001
= -6
0.000001 = x-6 . [0.000001 = 10-6 ]
10-6
= x-6 .
106
= x6 . { equal powers
cancel out}
x = 10
Hence x = 10
TRY THIS..................
Find x if Logx0.00000001
= -8
FACTORIZATION 3
Factorize x2
- 6x - 16 = 0
solution
x2 -
6x - 16 = 0 we split -6x to get ( -8x
+ 2x)
( -8x + 2x) =
-5x and ( -8x x 2x) = -16x2
x2 -
6x - 16 = 0
(x2
-8x) + (2x - 16) = 0
x(x - 8) + 2(x
- 8) = 0
(x - 8)(x +2) = 0
x - 8= 0 or x +
2 = 0
x = 8 or x = -2
TRY THIS.....................
Factorize x2
- 9x - 22 = 0
FUNCTIONS 7
If f(x) = x4
+ kx2 + 3x + 8 has a remainder of 22 when divided by x+2; find k.
solution
f(x) = x4
+ kx2 + 3x + 8
x + 2 = 0
x = -2
f(x) = (-2)4
+ k(-2)2 + 3(-2) + 8 = 22
16 + 4k + (-6)
+ 8 = 22
16 + 4k + 2 = 22
4k + 18 = 22
4k = 22 - 18
4k = 4
4k = 4
4 4
k = 1
hence k=1
TRY THIS......................
If f(x) = x4
- kx2 + 3x - 8 has a remainder of 40 when divided by x+3; find k.
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