Ejercicio 108

Gestor Baldor

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DESCARGA

CAPITULO X

Descomposición Factorial

Ejercicio 108

Descomponer en cuatro factores:

1– a 8 =( 1+ a 4 ) ( 1– a 4 ) =( 1+ a 4 ) ( 1+ a 2 ) ( 1– a 2 ) =( 1+ a 4 ) ( 1+ a 2 ) ( 1+a ) ( 1–a )
a 6 –1 =( a 3 –1 ) ( a 3 +1 ) =( a–1 ) ( a 2 +a+1 ) ( a+1 ) ( a 2 –a+1 )
x 4 –41 x 2 +400 = x 4 –41 x 2 +400+ x 2 – x 2 = x 4 –40 x 2 +400– x 2 = ( x 2 –20 ) 2 – x 2 =[ ( x 2 –20 ) –x ] [ ( x 2 –20 ) +x ] =( x 2 –x–20 ) ( x 2 +x–20 ) =( x 2 –5x+4x–20 ) ( x 2 –4x+5x–20 ) =[ x( x–5 ) +4( x–5 ) ] [ x( x–4 ) +5( x–4 ) ] =( x–5 ) ( x+4 ) ( x–4 ) ( x+5 )
a 4 –2 a 2 b 2 + b 4 = ( a 2 – b 2 ) 2 = [ ( a–b ) ( a+b ) ] 2 = ( a–b ) 2 ( a+b ) 2 =( a–b ) ( a–b ) ( a+b ) ( a+b )
x 5 + x 3 –2x =x( x 4 + x 2 –2 ) . 2 1 | 2 =x( x 4 – x 2 +2 x 2 –2 ) =x[ x 2 ( x 2 –1 ) +( x 2 –1 ) ] =x( x 2 –1 ) ( x 2 +1 ) =x( x–1 ) ( x+1 ) ( x 2 +1 )
2 x 4 +6 x 3 –2x–6 =2 x 3 ( x+3 ) –2( x+3 ) =( x+3 ) ( 2 x 3 –2 ) =2( x+3 ) ( x 3 –1 ) =2( x+3 ) ( x–1 ) ( x 2 +x+1 )
3 x 4 –243 =3( x 4 –81 ) =3( x 2 +9 ) ( x 2 –9 ) =3( x 2 +9 ) ( x–3 ) ( x+3 )
16 x 4 –8 x 2 y 2 + y 4 = ( 4 x 2 – y 2 ) 2 = [ ( 2x+y ) ( 2x–y ) ] 2 = ( 2x+y ) 2 ( 2x–y ) 2 =( 2x+y ) ( 2x+y ) ( 2x–y ) ( 2x–y )
9 x 4 +9 x 3 y– x 2 –xy =9 x 3 ( x+y ) –x( x+y ) =( x+y ) ( 9 x 3 –x ) =x( x+y ) ( 9 x 2 –1 ) =x( x+y ) ( 3x–1 ) ( 3x+1 )
12a x 4 +33a x 2 –9a =3a( 4 x 4 +11 x 2 –3 ) . 12 1 | 12 =3a( 4 x 4 – x 2 +12 x 2 –3 ) =3a[ x 2 ( 4 x 2 –1 ) +3( 4 x 2 –1 ) ] =3a( x 2 +3 ) ( 4 x 2 –1 ) =3a( x 2 +3 ) ( 2x–1 ) ( 2x+1 )
x 8 – y 8 =( x 4 + y 4 ) ( x 4 – y 4 ) =( x 4 + y 4 ) ( x 2 + y 2 ) ( x 2 – y 2 ) =( x 4 + y 4 ) ( x 2 + y 2 ) ( x+y ) ( x–y )
x 6 –7 x 3 –8 = x 6 –8 x 3 + x 3 –8 . 8 1 | 8 = x 3 ( x 3 –8 ) +( x 3 –8 ) =( x 3 –8 ) ( x 3 +8 ) =( x–2 ) ( x 2 +2x+4 ) ( x+2 ) ( x 2 –2x+4 )
64– x 6 =( 8– x 3 ) ( 8+ x 3 ) =( 2–x ) ( 4+2x+ x 2 ) ( 2+x ) ( 4–2x+ x 2 )
a 5 – a 3 b 2 – a 2 b 3 + b 5 = a 3 ( a 2 – b 2 ) – b 3 ( a 2 – b 2 ) =( a 2 – b 2 ) ( a 3 – b 3 ) =( a–b ) ( a+b ) ( a–b ) ( a 2 +ab+ b 2 )
8 x 4 +6 x 2 –2 =2( 4 x 4 +3 x 2 –1 ) . 4 1 | 4 =2( 4 x 4 – x 2 +4 x 2 –1 ) =2[ x 2 ( 4 x 2 –1 ) +( 4 x 2 –1 ) ] =2( 4 x 2 –1 ) ( x 2 +1 ) =2( 2x+1 ) ( 2x–1 ) ( x 2 +1 )
a 4 –25 a 2 +144 = a 4 –9 a 2 –16 a 2 +144 . 144 72 36 18 9 1 | 2 2 2 2 9 = a 2 ( a 2 –9 ) –16( a 2 –9 ) =( a 2 –9 ) ( a 2 –16 ) =( a–9 ) ( a+3 ) ( a+4 ) ( a–4 )
a 2 x 3 – a 2 y 3 +2a x 3 –2a y 3 = a 2 ( x 3 – y 3 ) +2a( x 3 – y 3 ) =( a 2 +2a ) ( x 3 – y 3 ) =a( a+2 ) ( x–y ) ( x 2 +xy+ y 2 )
a 4 +2 a 3 – a 2 –2a = a 4 – a 2 +2 a 3 –2a = a 2 ( a 2 –1 ) +2a( a 2 –1 ) =( a 2 +2a ) ( a 2 –1 ) =a( a+2 ) ( a–1 ) ( a+1 )
1–2 a 3 + a 6 = ( 1– a 3 ) 2 = [ ( 1–a ) ( 1+a+ a 2 ) ] 2 = ( 1–a ) 2 ( 1+a+ a 2 ) 2
m 6 –729 =( m 3 +27 ) ( m 3 –27 ) =( m+3 ) ( m 2 –3m+9 ) ( m–3 ) ( m 2 +3m+9 )
x 5 –x =x( x 4 –1 ) =x( x 2 +1 ) ( x 2 –1 ) =x( x 2 +1 ) ( x–1 ) ( x+1 )
x 5 – x 3 y 2 + x 2 y 3 – y 5 = x 3 ( x 2 – y 2 ) + y 3 ( x 2 – y 2 ) =( x 2 – y 2 ) ( x 3 + y 3 ) =( x+y ) ( x–y ) ( x+y ) ( x 2 –xy+ y 2 )
a 4 b– a 3 b 2 – a 2 b 3 +a b 4 = a 3 b( a–b ) –a b 3 ( a–b ) =( a–b ) ( a 3 b–a b 3 ) =ab( a–b ) ( a 2 – b 2 ) =ab( a–b ) ( a+b ) ( a–b )
5 a 4 –3125 =5( a 4 –625 ) =5( a 2 +25 ) ( a 2 –25 ) =5( a 2 +25 ) ( a–5 ) ( a+5 )
( a 2 +2a ) 2 –2( a 2 +2a ) –3 = ( a 2 +2a ) 2 –3( a 2 +2a ) +( a 2 +2a ) –3 . 3 1 | 3 =( a 2 +2a ) [ ( a 2 +2a ) –3 ] +[ ( a 2 +2a ) –3 ] =[ ( a 2 +2a ) –3 ] [ ( a 2 +2a ) +1 ] =( a 2 +2a–3 ) ( a 2 +2a+1 ) =( a 2 –a+3a–3 ) ( a+1 ) 2 =[ a( a–1 ) +3( a–1 ) ] ( a+1 ) 2 =( a+3 ) ( a–1 ) ( a+1 ) 2 =( a+3 ) ( a–1 ) ( a+1 ) ( a+1 )
a 2 x 3 +2a x 3 –8 a 2 –16a =a x 3 ( a+2 ) –8a( a+2 ) =( a+2 ) ( a x 3 –8a ) =a( a+2 ) ( x 3 –8 ) =a( a+2 ) ( x–2 ) ( x 2 +2x+4 )
1– a 6 b 6 =( 1– a 3 b 3 ) ( 1+ a 3 b 3 ) =( 1–ab ) ( 1+ab+ a 2 b 2 ) ( 1+ab ) ( 1–ab+ a 2 b 2 )
5a x 3 +10a x 2 –5ax–10a =5a x 3 –5ax+10a x 2 –10a =5ax( x 2 –1 ) +10a( x 2 –1 ) =( x 2 –1 ) ( 5ax+10a ) =5a( x–1 ) ( x+1 ) ( x+2 )
a 2 x 2 + b 2 y 2 – b 2 x 2 – a 2 y 2 = a 2 x 2 – a 2 y 2 – b 2 x 2 + b 2 y 2 = a 2 ( x 2 – y 2 ) – b 2 ( x 2 – y 2 ) =( x 2 – y 2 ) ( a 2 – b 2 ) =( x+y ) ( x–y ) ( a+b ) ( a–b )
x 8 + x 4 –2 = x 8 – x 4 +2 x 4 –2 . 2 1 | 2 = x 4 ( x 4 –1 ) +2( x 4 –1 ) =( x 4 –1 ) ( x 4 +2 ) =( x 2 –1 ) ( x 2 +1 ) ( x 4 +2 ) =( x–1 ) ( x+1 ) ( x 2 +1 ) ( x 4 +2 )
a 4 + a 3 –9 a 2 –9a = a 3 ( a+1 ) –9a( a+1 ) =( a+1 ) ( a 3 –9a ) =a( a+1 ) ( a 2 –9 ) =a( a+1 ) ( a–3 ) ( a+3 )
a 2 x 2 + a 2 x–6 a 2 – x 2 –x+6 = a 2 ( x 2 +x–6 ) –( x 2 +x–6 ) =( x 2 +x–6 ) ( a 2 –1 ) =( x 2 –2x+3x–6 ) ( a 2 –1 ) =[ x( x–2 ) +3( x–2 ) ] ( a 2 –1 ) =( x+3 ) ( x–2 ) ( a+1 ) ( a–1 )
16 m 4 –25 m 2 +9 =16 m 4 –25 m 2 +9+ m 2 – m 2 =16 m 4 –24 m 2 +9– m 2 = ( 4 m 2 –3 ) 2 – m 2 =[ ( 4 m 2 –3 ) –m ] [ ( 4 m 2 –3 ) +m ] =( 4 m 2 –m–3 ) ( 4 m 2 +m–3 ) =( 4 m 2 –4m+3m–3 ) ( 4 m 2 +4m–3m–3 ) =[ 4m( m–1 ) +3( m–1 ) ] [ 4m( m+1 ) –3( m+1 ) ] =( m–1 ) ( 4m+3 ) ( m+1 ) ( 4m–3 )
3ab x 2 –12ab+3b x 2 –12b =3ab x 2 +3b x 2 –12ab–12b =3b x 2 ( a+1 ) –12b( a+1 ) =( a+1 ) ( 3b x 2 –12b ) =3b( a+1 ) ( x 2 –4 ) =3b( a+1 ) ( x–2 ) ( x+2 )
3 a 2 m+9am–30m+3 a 2 +9a–30 =3m( a 2 +3a–10 ) +3( a 2 +3a–10 ) . 10 5 1 | 2 5 =( a 2 +3a–10 ) ( 3m+3 ) =3( a 2 –2a+5a–10 ) ( m+1 ) =3[ a( a–2 ) +5( a–2 ) ] ( m+1 ) =3( a–2 ) ( a+5 ) ( m+1 )
a 3 x 2 –5 a 3 x+6 a 3 + x 2 –5x+6 = a 3 ( x 2 –5x+6 ) +( x 2 –5x+6 ) . 6 3 1 | 2 3 =( x 2 –2x–3x+6 ) ( a 3 +1 ) =[ x( x–2 ) –3( x–2 ) ] ( a 3 +1 ) =( x–3 ) ( x–2 ) ( a 3 +1 ) =( x–3 ) ( x–2 ) ( a+1 ) ( a 2 –a+1 )
x 2 ( x 2 – y 2 ) –( 2x–1 ) ( x 2 – y 2 ) =( x 2 – y 2 ) [ x 2 –( 2x–1 ) ] =( x–y ) ( x+y ) ( x 2 –2x+1 ) =( x–y ) ( x+y ) ( x–1 ) 2 =( x–y ) ( x+y ) ( x–1 ) ( x–1 )
a( x 3 +1 ) +3ax( x+1 ) =a[ ( x 3 +1 ) +3x( x+1 ) ] =a[ ( x+1 ) ( x 2 –x+1 ) +3x( x+1 ) ] =a[ ( x+1 ) { ( x 2 –x+1 ) +3x } ] =a[ ( x+1 ) { x 2 –x+1+3x } ] =a( x+1 ) ( x 2 +2x+1 ) =a( x+1 ) ( x+1 ) 2 =a( x+1 ) ( x+1 ) ( x+1 )