Published by – Thanks to Mr. Ravi, B.T. Asst, GHS, Arangaladurgam.
-
Upload
alexandro-delane -
Category
Documents
-
view
220 -
download
4
Transcript of Published by – Thanks to Mr. Ravi, B.T. Asst, GHS, Arangaladurgam.
Published by – www.Padasalai.Net
Thanks to Mr. Ravi, B.T. Asst, GHS, Arangaladurgam.
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + +
= (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + +
= (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + +
= (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + +
= (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + +
= (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + +
= (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + +
= (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + +
= (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + +
= (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + +
= (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + +
= (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + += (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + += (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + += (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + += (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + += (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + += (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + += (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + += (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + += (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + += (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + += (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + += (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)
k/r]`pfpDtfTk: x3 + 13x2 + 32x + 20
– 1 +1 + 13 + 32 + 20
0 – 1 – 12 – 20 (x + 1) oR k/r]`
+ 1 + 12 + 20 0
x2 + 12x + 20 <p.p. + 20 $. p. + 12
= x2 + 2x + 10x + 20 + += (X x X) + (2 x X) + (2x5xX) + (2x2x5) + 1 + 20 (+21)
= X (X+2) + 5 (X+2) + 2 + 10 (+12)
= (X + 2) (X + 5)
k/r]`kqf = (X + 1) (X + 2) (X +5)