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College Algebra Practice Ex1

This document provides a series of practice exercises involving college algebra concepts and operations. The exercises include: 1) Adding, subtracting, multiplying, and dividing polynomials. 2) Using special product formulas to expand expressions. 3) Factoring polynomials completely. 4) Reducing fractions to lowest terms. 5) Performing operations on rational expressions.

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John Nixon F. Vacalares
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202 views2 pages

College Algebra Practice Ex1

This document provides a series of practice exercises involving college algebra concepts and operations. The exercises include: 1) Adding, subtracting, multiplying, and dividing polynomials. 2) Using special product formulas to expand expressions. 3) Factoring polynomials completely. 4) Reducing fractions to lowest terms. 5) Performing operations on rational expressions.

Uploaded by

John Nixon F. Vacalares
Copyright
© © All Rights Reserved
We take content rights seriously. If you suspect this is your content, claim it here.
Available Formats
Download as PDF, TXT or read online on Scribd
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COLLEGE ALGEBRA PRACTICE EXERCISES 1

I. Know the structure of the real number system (rational, irrational, integers, natural numbers,
decimals). Know also the properties of real numbers.

II. Do as indicated.
1. Add 2x 2 + xy − 5 y 2 and − 7x 2 − 5xy − 6 y 2 .
2. Subtract 2a + 2b – 4c from the sum of 4a – 7b + 12c and 5b – 3c.
3. 9x – (2y – 3x) – {y – ( 2y – x)} – [2y + 2(4x – 3y)]
4. 2a 3 − 5a{ a 2 + 4[2a − 5( a − 3) + 3] − a 2 }
5. a. ( 55 36 )4 b. ( −4 x 3 y 4 )3 ( −2x 4 y7 )3 c. (5x 0 y7 )( −5 y 8 )2
d. (25 )( 2 −7 )( 2 −2 ) e. (3s5t −4 ) −6 f. ( −5m−1n 4 )3 (n −3m−2 ) −7
4 2
 3a 2   bc 2  3u 2v3 28w 2 u ( a b + 3 d b + 2 )3 ( x n + 2 y 2n +1 ) p
6. a.  3 0    b.  c. d.
b c   9a 6  7w 4 33u 2v 2 a 3b d 6 ( x p +1 y 2 p − 2 )n
   
2 −2 −4
 2−2   3− 4   3a 2ab − 3 c7  9 −1 t −3 y 5 9 2 a −1
7. a.  3    b.   c. d.
 3   26   2a − 3b3 c 0  (4 −1 ty − 2 ) − 3 ( 3 a +1 ) n
     
2
 3 −1 − 2  − 2 
19 −14 4 −2 x −1 y 3 z 4 u v w
e. 10 10 f. g.  − 2 − 2  
10 −510 3 6−3 x 4 y2 z −3  u v w  

 
8.a. 3xy(2x – 3y)(x + 5y) b. 3xy(2x + 3x 2 y) − 2x 2 y(4 − xy)
9. a. (4 x 2 − 4 x + 1)( 2x 2 + 3x − 3) b. (2x 2 − 3xy + y 2 )( x 2 + 4 xy − 3 y 2 )
10. (2x 2n − x n + 10)( x − 1)
11. a. Divide 6x 3 + 5x 2 − 4 x + 4 by 2x + 3 b. Divide 4 x 3 − 2x + 3 by 2x - 1
12. a. Divide 4 x 3 − 5x 4 − 4 x 2 + 4 by x + 2 b. Divide 16a 4n − 64a10n by 2a 3n
13. a. Divide x 9 + x 5 + x 2 + 1 by x 2 − x + 1 b. Divide 3x 4 − 4 x 2 + 8x + 3 by 3x 2 + 6x + 2
14. a. Divide x 3 + y 3 by x − 2 y b. Divide 4 x 2 − 6xy − 3 y 2 by 2x + 3 y
c. Divide 3z 3 − 11z 2 x − 18zx 2 − 6x 3 by z − 5x
III. Use special product formulas to find the following.

1. 7x + 3 y)( 2x − 4 y) 12. (6m + 5n)( 6m + 5n)


2. (2mn − 3r )(5mn + 2r ) 13. (5t3 − 2) (5t3 − 2)
3. ( 5x − 3 y )2 14. ( x n − y n )3
4. ( 3x 2 + 2 y3 )2 15. ( 5x − y + 2z )2
5. ( 5x 3 y − 3z 4 )2 16. ( a − 6b − 2c)2
6. ( 4x − y)3 17. ( 2x − y + 2z + 3w)2
7. ( xy2 + 2c)3 18. [(3x − 2 y) + 4 z ] [(3x − 2 y) − 4 z ]
2 3
8. ( 3x − x ) 19. [( 2x 2 − x ) − 3] [(2x 2 − x ) + 3]
9. (4 x − 3 y )( 4 x + 3 y) 20. [2( x + y) − 5][3( x + y) + 4 ]
10. ( 5a 3 − 7b4 ) ( 5a 3 + 7b4 ) 21. [( 2x 2 − x ) + ( x 3 − 1)] [( 2x 2 − x ) − ( x 3 − 1)]
 ab c  ab c 
11.  +  −  22. [( a 2 − 2b) + ( x 3 − y 2 )] [( a 2 − 2b) − ( x 3 − y 2 )]
 3 4  3 4 

IV. Factor the following completely.


1. 2x 3 + 4 x 2 − 10x 16. a 2b2 − ab − 20
2. 6xy2 z 3 − 12x 2 yz 2 + 4 xy3 z 2 17. 10x 2 + 11x − 6
3. 3y(2x + 5) – 4x(2x + 5) 18. 6 p4 − 13 p2 q 2 + 6q4
4. 3x 2 ( x + 3 y) + 6xz( x + 3 y)2 19. 16x 6 + 24 x 5 + 9x 4
5. 2 5x 2 − 16z 2 20. x 2 + 10xy + 25 y 2
6. 4 x 4 − y 8 z 6 21. a 2 − ab + + a − b
7. x 3 y 4 − 9xd6 22. 2c 2 + 4cd − 3c − 6d
8. 81(2x + 3z )2 − 4r 4 23. x 4 + 2x 2 + 1 − x 2
9. 64a 2 − 4(4m − 3n)2 24. 4 x 2 − 3xy − 24xz + 18 yz
10. 27a 3 − b3 25. a 2 − 2ab + b2 − ac + bc
11. a 3 + 8b6 26. x 3 − y3 − x 2 + 2xy − y 2
12. 8x12 − y 9 27. 2c 2 + 5cd − 3d 2 + 8c3 − d 3
13. 64( x − 3b)3 − a 3 28. 2( x − 3)( 4 x + 7)2 + 8( x − 3)2 (4 x + 7)
14. 9a 3 − 4b2 c 2 a 29. 6( x − y)2 + 23( x − y) − 4
15. 625x 4 y − 81y 9 30. 25(4 x 2 − 12xy + 9 y 2 ) − 9a 2b2

V. Reduce the following fractions to lowest terms. Assume none of the denominators is zero.
36x 2 y 5 6a 2 − 7 a − 3 x 3 − 27 4b2 − 1
1. 2. 3. 4.
30xy7 4 a 2 − 8a + 3 3−x 12b2 + b − 4b3 − 3

VI. Perform the indicated operations. Assume none of the denominators is zero.
40x 3 y 2 27 xy y 2 − 2 y − 15 y 2 − 6 y + 9
1.  2. 
24 xy 4 8x 2 y 3 y2 − 9 12 − 4 y
c 3 + dc 2 bc 2 + bd 2 bc 27x 3 − y 3x 2 + 2xy − 3 y 2 xy + 3 y 2
3. 2 2
 2 2
 4.  
c +d c −d c−d 3x 2 − 4 xy + y 2 9x 2 + 3xy + y 2 x 2 − 9 y 2
x +1 x + 3 3x − 2 y 2 x − y
5. − 6. +
x +2 x 5x − 3 3 − 5x
2 3 x 6x + 6 x +1
7. − 8. − 2 +
12x − 3 2x − 4 x 2
2 x +3 x −9 x −3
1 2 2x − 1 x +3 2x − 3
9. − 10. 2
+ 2 − 2
a −3 3−a 2x − x − 6 6x + x − 12 3x − 10x + 8
x + 1 x 2 − 2x + 1  3 1  x +4
11.  12.  − 
x (1 − x ) x2 −1  x − 2 x +1 x − 2
c+2 c−2 c  3x 3x + 2   x + 2 x 
13. − + 14.  − 2   − 2 
3c − 5 3c − 3 1 − c  x − 3 x − 6x + 9   x + 3 x + 6x + 9 
1 1 4
x2 − −
5x + 1 x x 2 x3
15. x +6 + − 16. 17.
2
12x + 5x − 2 3x + 2 1 1 1 1
x +1 + + +
x x 2 4 2x
5 3 x2 1 2

1
+ x−
x − 2 2x + 1 x −1 x p + q p − 2q
18. 19. 20. 21.
1 + 12x x2 −1 1 p+q
−1 x+ 1− 2−
2−x 1 2x p − 2q
1+ 1+
x y

VII. Simplify the following expressions. Assume all the variables make them defined.
x −1 + y −1 y −2 − x −1 y −1 − 6x −2 a −2 − a −3 y −2
1. 2. 3.
( x + y ) −1 x −1 y − 2 + 2x − 2 y −1 a −3 y −2 − y −2
4( x − 3) −4 u+v xy −2 − yx −2
4. ( x −2 + y −2 ) −1 5. 6. 7.
8( x − 3) − 2 u −1 + v −1 y −1 − x −1

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