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All Textbook Solutions for Elementary Algebra

In the following exercises, factor completely. 433. 24x3+44x2 In the following exercises, factor completely. 434. 24a49a3 In the following exercises, factor completely. 435. 16n256mn+49m2 In the following exercises, factor completely. 436. 6a225a9 In the following exercises, factor completely. 437. 5r2+22r48 In the following exercises, factor completely. 438. 5u445u2 In the following exercises, factor completely. 439. n481 In the following exercises, factor completely. 440. 64j2+225 In the following exercises, factor completely. 441. 5x2+5x60 In the following exercises, factor completely. 442. b364 In the following exercises, factor completely. 443. m3+125 In the following exercises, factor completely. 444. 2b22bc+5cb5c2 In the following exercises, solve. 445. (a3)(a+7)=0 In the following exercises, solve. 446. (b3)(b+10)=0 In the following exercises, solve. 447. 3m(2m5)(m+6)=0 In the following exercises, solve. 448. 7n(3n+8)(n5)=0 In the following exercises, solve. 449. x2+9x+20=0 In the following exercises, solve. 450. y2y72=0 In the following exercises, solve. 451. 2p211p=40 In the following exercises, solve. 452. q3+3q2+2q=0 In the following exercises, solve. 453. 144m225=0 In the following exercises, solve. 454. 4n2=36 In the following exercises, solve. 455. The product of two consecutive numbers is 462. Find the numbers.In the following exercises, solve. 456. The area of a rectangular shaped patio 400 square feet. The length of the patio is 9 feet more than its width. Find the length and width.In the following exercises, find the Greatest Common Factor in each expression. 457. 14y42 In the following exercises, find the Greatest Common Factor in each expression. 458. 6x230x In the following exercises, find the Greatest Common Factor in each expression. 459. 80a2+120a3 In the following exercises, find the Greatest Common Factor in each expression. 460. 5m(m1)+3(m1)In the following exercises, factor completely. 461. x2+13x+36 In the following exercises, factor completely. 462. p2+pq12q2 In the following exercises, factor completely. 463. 3a36a272a In the following exercises, factor completely. 464. s225s+84 In the following exercises, factor completely. 465. 5n2+30n+45 In the following exercises, factor completely. 466. 64y249 In the following exercises, factor completely. 467. xy8y+7x56 In the following exercises, factor completely. 468. 40r2+810 In the following exercises, factor completely. 469. 9s212s+4 In the following exercises, factor completely. 470. n2+12n+36 In the following exercises, factor completely. 471. 100a2 In the following exercises, factor completely. 472. 6x211x10 In the following exercises, factor completely. 473. 3x275y2 In the following exercises, factor completely. 474. c31000d3 In the following exercises, factor completely. 475. ab3b2a+6 In the following exercises, factor completely. 476. 6u2+3u18 In the following exercises, factor completely. 477. 8m2+22m+5 In the following exercises, solve. 478. x2+9x+20=0 In the following exercises, solve. 479. y2=y+132 In the following exercises, solve. 480. 5a2+26a=24 In the following exercises, solve. 481. 9b29=0 In the following exercises, solve. 482. 16m2=0 In the following exercises, solve. 483. 4n2+19+21=0 In the following exercises, solve. 484. (x3)(x+2)=6 In the following exercises, solve. 485. The product of two consecutive integers is 156. Find the integers.In the following exercises, solve. 486. The area of a rectangular place mat is 168 square inches. Its length is two inches longer than the width. Find the length and width of the placemat.Determine the values for which the rational expression is undefined: a.3yx b. 8n53n+1 c. a+10a2+4a+3 Determine the values for which the rational expression is undefined: a. 4p5q b. y13y+2 c. m5m2+m6 Evaluate y+12y3 for each value: a. y=1b. y=3c. y=0 Evaluate 5x12x+1 for each value: a. x=1b. x=1 c. x=0 Evaluate x2+1x23x+2 for each value: a. x=0 b. x=1 c. x=3 Evaluate x2+x6x29 for each value: a. x=0b. x=2 c. x=1 Evaluate 2a3ba2+2ab+b2 for each value: a. a=1,b=2b. a=0,b=1c. a=1,b=12 Evaluate a2b28ab3 for each value: a. a=1,b=1 b. a=12,b=1c. a=2,b=1 Simplify: 4581 .Simplify: 4254 Simplify: 4x2y12xy2 .Simplify: 16x2y2xy2 .Simplify: 3x62x4 .Simplify: 7y+355y+25 .Simplify: x2x2x23x+2 .Simplify: x23x10x2+x2 Simplify: x2+x6x24 Simplify: x2+8x+7x249 .Simplify: y33y2+y3y2y6 .Simplify: p3p2+2p2p2+4p5 .Simplify: 2n210n4n216n20 .Simplify: 4x216x8x216x64 .Simplify: 2x212x+183x227 .Simplify: 5y230y+252y250 .Simplify : p364p216 .Simplify: x3+8x24 .Simplify: y22y .Simplify: n99n .Simplify: 102yy225 .Simplify: 3y2781y2 .Simplify: x24x525x2 .Simplify: x2+x21x2 .In the following exercises, determine the values for which the rational expression is undefined. 1.a. 2xz a. 4p16p5 b. n3n2+2n8 In the following exercises, determine the values for which the rational expression is undefined. 2. a. 10m11n b. 6y+134y9 c. b8b236 In the following exercises, determine the values for which the rational expression is undefined. 3. a. 4x2y3y b. 3x22x+1 c. u1u23u28 In the following exercises, determine the values for which the rational expression is undefined. 4. a. 5pq29q b. 7a43a+5 c. 1x24 In the following exercises, evaluate the rational expression for the given values. 5. 2xx1 a. x=0 b. x=2 c. x=1 In the following exercises, evaluate the rational expression for the given values. 6. 4y15y3 a. y=0 b. y=2 c. y=1 In the following exercises, evaluate the rational expression for the given values. 7. 2p+3p2+1 a. p=0 b. p=1 c. p=2 In the following exercises, evaluate the rational expression for the given values. 8. x+323x a. x=0 b. x=1 c. x=2 In the following exercises, evaluate the rational expression for the given values. 9. y2+5y+6y21 a. y=0 b. y=2 c. y=2 In the following exercises, evaluate the rational expression for the given values. 10. z2+3z10z21 a. z=0 b. z=2 c. z=2 In the following exercises, evaluate the rational expression for the given values. 11. a24a2+5a+4 a. a=0 b. a=1 c. a=2 In the following exercises, evaluate the rational expression for the given values. 12. b2+2b23b4 a. b=0 b. b=2 c. b=2 In the following exercises, evaluate the rational expression for the given values. 13. x2+3xy+2y22x3y a. x=1,y=1 b. x=2,y=1 c. x=1,y=2 In the following exercises, evaluate the rational expression for the given values. 14. c2+cd2d2cd3 a. c=2,d=1 b. c=1,d=1 c. c=1,d=2 In the following exercises, evaluate the rational expression for the given values. 15. m24n25mn3 a. m=2,n=1 b. m=1,n=1 c. m=3,n=2 In the following exercises, evaluate the rational expression for the given values. 16. 2s2ts29t2 a. s=4,t=1 b. s=1,t=1 c. s=0,t=2 In the following exercises, simplify. 17. 452 In the following exercises, simplify. 18. 4455 In the following exercises, simplify. 19. 5663 In the following exercises, simplify. 20. 65104 In the following exercises, simplify. 21. 6ab212a2b In the following exercises, simplify. 22. 15xy3x3y3 In the following exercises, simplify. 23. 8m3n12mn2 In the following exercises, simplify. 24. 36v3w227vw3 In the following exercises, simplify. 25. 3a+64a+8 In the following exercises, simplify. 26. 5b+56b+6 In the following exercises, simplify. 27. 3c95c15 In the following exercises, simplify. 28. 4d+89d+18 In the following exercises, simplify. 29. 7m+635m+45 In the following exercises, simplify. 30. 8n963n36 In the following exercises, simplify. 31. 12p2405p100 In the following exercises, simplify. 32. 6q+2105q+175 In the following exercises, simplify. 33. a2a12a28a+16 In the following exercises, simplify. 34. x2+4x5x22x+1 In the following exercises, simplify. 35. y2+3y4y26y+5 In the following exercises, simplify. 36. v2+8v+15v2v12 In the following exercises, simplify. 37. x225x2+2x15 In the following exercises, simplify. 38. a24a2+6a16 In the following exercises, simplify. 39. y22y3y29 In the following exercises, simplify. 40. b2+9b+18b236 In the following exercises, simplify. 41. y3+y2+y+1y2+2y+1 In the following exercises, simplify. 42. p3+3p2+4p+12p2+p6 In the following exercises, simplify. 43. x32x225x+50x225 In the following exercises, simplify. 44. q3+3q24q12q24 In the following exercises, simplify. 45. 3a2+15a6a2+6a36 In the following exercises, simplify. 46. 8b232b2b26b80 In the following exercises, simplify. 47. 5c210c10c2+30c+100 In the following exercises, simplify. 48. 4d224d2d24d48 In the following exercises, simplify. 49. 3m2+30m+754m2100 In the following exercises, simplify. 50. 5n2+30n+452n218 In the following exercises, simplify. 51. 5r2+30r35r249 In the following exercises, simplify. 52. 3s2+30s+243s248 In the following exercises, simplify. 53. t327t29 In the following exercises, simplify. 54. v31v21 In the following exercises, simplify. 55. w3+216w236 In the following exercises, simplify. 56. v3+125v225 In the following exercises, simplify each rational expression. 57. a55a In the following exercises, simplify each rational expression. 58. b1212b In the following exercises, simplify each rational expression. 59. 11cc11 In the following exercises, simplify each rational expression. 60. 5dd5 In the following exercises, simplify each rational expression. 61. 122xx236 In the following exercises, simplify each rational expression. 62. 205yy216 In the following exercises, simplify each rational expression. 63. 4v3264v2 In the following exercises, simplify each rational expression. 64. 7w219w2 In the following exercises, simplify each rational expression. 65. y211y+249y2 In the following exercises, simplify each rational expression. 66. z29z+2016z2 In the following exercises, simplify each rational expression. 67. a25z3681a2 In the following exercises, simplify each rational expression. 68. b2+b4236b2 Tax Rates For the tax year 2015, the amount of tax owed by a single person earning between $37,450 and $90,750, can be found by evaluating the formula 0.25x4206.25 , where x is income. The average tax rate for this income can be found by evaluating the formula 0.25x4206.25x . What would be the average tax rate for a single person earning $50,000?Work The length of time it takes for two people for perform the same task if they work together can be found by evaluating the formula xyx+y . If Tom can paint the den in x=45 minutes and his brother Bobby can paint it in y=60 minutes, how many minutes will it take them if they work together?Explain how you find the values of x for which the rational expression x2x20x24 is undefined.Explain all the steps you take to simplify the rational expression p2+4p219p2 .Multiply: 6101512 .Multiply: 201568 .Multiply: 3pqq25p2q6pq .Multiply: 6x3y7x22xy3x2y Multiply: 5xx2+5x+6x2410x .Multiply: 9x2x2+11x+30x2363x2 .Multiply: x225x23x10x+2x .Multiply: x24xx2+5x+6x+2x .Multiply: 12x6x2x2+8xx2+11x+24x24 .Multiply: 9v3v29v+36v2+7v+12v29 .Multiply: 3a21a29a+14a243a+6 .Multiply: b2bb2+9b10b2100b210b .Divide: c+35cc29c5 .Divide: 2dd44d24d .Divide: 2m2m28m8m2+24mm2+m6 .Divide: 15n23n2+33n5n5n2+9n22 .Divide: 3a28a3a2253a214a5a2+10a+25 .Divide: 4b2+7b21b24b2+15b4b22b+1 .Divide: x383x26x+12x246 .Divide: 2z2z21z3z2+zz31 .Divide: 2x214x164(x2+2x+1) .Divide: y26y+8y24y(3y212y) .Divide: 3x2+7x+24x+243x214x5x2+x30 .Divide: y2362y2+11y62y22y608y4 .Divide: 4m+43m15m23m10m24m3212m366m48 .Divide: 2n2+10nn1n2+10n+24n2+8n9n+48n2+12n .In the following exercises, multiply. 73. 1216410 In the following exercises, multiply. 74. 3251624 In the following exercises, multiply. 75. 1810430 In the following exercises, multiply. 76. 21364524 In the following exercises, multiply. 77. 5x2y412xy36x220y2 In the following exercises, multiply. 78. 8w3y9y23y4w4 In the following exercises, multiply. 79. 12a3bb22ab29b3 In the following exercises, multiply. 80. 4mn25n3mn38m2n2 In the following exercises, multiply. 81. 5p2p25p36p21610p In the following exercises, multiply. 82. 3q2q2+q6q299q In the following exercises, multiply. 83. 4rr23r10r2258r2 In the following exercises, multiply. 84. ss29s+14s2497s2 In the following exercises, multiply. 85. x27xx2+6x+9x+34x In the following exercises, multiply. 86. 2y210yy2+10y+25y+56y In the following exercises, multiply. 87. z2+3zz23z4z4z2 In the following exercises, multiply. 88. 2a2+8aa29a+20a5a2 In the following exercises, multiply. 89. 284b3b3b2+8b9b249 In the following exercises, multiply. 90. 18c2c26c+30c2+7c+10c281 In the following exercises, multiply. 91. 35d7d2d2+7dd2+12d+35d225 In the following exercises, multiply. 92. 72m12m28m+32m2+10m+24m236 In the following exercises, multiply. 93. 4n+20n2+n20n2164n+16 In the following exercises, multiply. 94. 6p26pp2+7p18p2813p227p In the following exercises, multiply. 95. q22qq2+6q16q264q28q In the following exercises, multiply. 96. 2r22rr2+4r5r2252r210r the following exercises, divide. 97. t63tt29t5 In the following exercises, divide. 98. v511vv225v11 In the following exercises, divide. 99. 10+ww8100w28w In the following exercises, divide. 100. 7+xx649x2x+6 In the following exercises, divide. 101. 27y23y213y2+18y2+13y+42 In the following exercises, divide. 102. 24z22z84z28z211z+28 In the following exercises, divide. 103. 16a24a+364a224aa2+4a45 In the following exercises, divide. 104. 24b22b412b2+36bb211b+18 In the following exercises, divide. 105. 5c2+9c+2c2253c214c5c2+10c+25 In the following exercises, divide. 106. 2d2+d3d2162d29d18d28d+16 In the following exercises, divide. 107. 6m22m109m26m2+29m20m26m+9 In the following exercises, divide. 108. 2n23n1425n22n213n+21n210n+25 In the following exercises, divide. 109. 3s2s216s34s2+16ss364 In the following exercises, divide. 110. r2915r3275r2+15r+45 In the following exercises, divide. 111. p3+q33p2+3pq+3q2p2q212 In the following exercises, divide. 112. v38w32v2+4vw+8w2v24w24 In the following exercises, divide. 113. t292t(t26t+9)In the following exercises, divide. 114. x2+3x104x(2x2+20x+50)In the following exercises, divide. 115. 2y210yz48z22y1(4y232yz)In the following exercises, divide. 116. 2m298n22m+6(m27mn)In the following exercises, divide. 117. 2a2a215a+20a2+7a+12a2+8a+16 In the following exercises, divide. 118. 3b2+2b812b+183b2+2b82b27b15 In the following exercises, divide. 119. 12c2122c23c+14c+46c213c+5 In the following exercises, divide. 120. 4d2+7d235d+10d247d212d4 In the following exercises, divide. 121. 10m2+80m3m9m2+4m21m29m+205m2+10m2m10 In the following exercises, divide. 122. 4n2+32n3n+23n2n2n2+n30108n224nn+6 In the following exercises, divide. 123. 12p2+3pp+3p2+2p63p2p12p79p39p2 In the following exercises, divide. 124. 6q+39q29qq2+14q+33q2+4q54q2+12q12q+6 Probability The director of large company is interviewing applicants for two identical jobs. If w = the number of women applicants and m = the number of men applicants, then the probability that two women are selected for the jobs is ww+mw1w+m1 . a. Simplify the probability by multiplying the two rational expressions. b.Find the probability that two women are selected when w = 5 and m = 10.Area of a triangle The area of a triangle with base b and height h is bh2 . If the triangle is stretched to make a new triangle with base and height three times as much as in the original triangle, the area is 9bh2 . Calculate how the area of the new triangle compares to the area of the original triangle by dividing 9bh2 by bh2 .Multiply a. 74910 and explain all your steps. b. Multiply nn39n+3 and explain all your steps. c. Evaluate your answer to part (b) when n=7 . Did you get the same answer you get in part (a)? Why or why not?a. Divide 2456and explain all your steps. b. Divide x21x(x+1) and explain all your steps. c. Evaluate your answer to part (b) when x=5 . Did you get the same answer you get in part (a)? Why or why not?Add: 716+516 .Add: 310+110 .Add: 5x2x+3+22x+3 .Add; xx2+1x2 .Add; 9x+14x+7+x2x+7 .Add: x2+8xx+5+15x+5 .Subtract: x2x+39x+3 .Subtract: 4x22x5252x5 .Subtract: n2n4n+12n4 .Subtract: y2y19y8y1 .Subtract: 4x211x+8x23x+23x2+x3x23x+2 .Subtract: 6x2x+20x2815x2+11x7x281 .Add: 8x152x5+2x52x .Add: 6y2+7y104y7+2y2+2y+1174y .Subtract: y25yy246y64y2 .Subtract: 2n2+8n1n21n27n11n2 .In the following exercises, add. 129. 215+715 In the following exercises, add. 130. 421+321 In the following exercises, add. 131. 724+1124 In the following exercises, add. 132. 736+1336 In the following exercises, add. 133. 3aab+1ab In the following exercises, add. 134. 3c4c5+54c5 In the following exercises, add. 135. dd+8+5d+8 In the following exercises, add. 136. 7m2m+n+42m+n In the following exercises, add. 137. p2+10pp+2+16p+2 In the following exercises, add. 138. q2+12qq+3+27q+3 In the following exercises, add. 139. 2r22r1+15r82r1 In the following exercises, add. 140. 3s23s2+13s103s2 In the following exercises, add. 141. 8t2t+4+32tt+4 In the following exercises, add. 142. 6v2v+5+30vv+5 In the following exercises, add. 143. 2w2w216+8ww216 In the following exercises, add. 144. 7x2x29+21xx29 In the following exercises, subtract. 145. y2y+864y+8 In the following exercises, subtract. 146. z2z+24z+2 In the following exercises, subtract. 147. 9a23a7493a7 In the following exercises, subtract. 148. 25b25b6365b6 In the following exercises, subtract. 149. c2c86c+16c8 In the following exercises, subtract. 150. d2d96d+27d9 In the following exercises, subtract. 151. 3m26m3021m306m30 In the following exercises, subtract. 152. 2n24n3230n164n32 In the following exercises, subtract. 153. 6p2+3p+4p2+4p55p2+p+7p2+4p5 In the following exercises, subtract. 154. 5q2+3q9q2+6q+84q2+9q+7q2+6q+8 In the following exercises, subtract. 155. 5r2+7r33r2494r25r30r249 In the following exercises, subtract. 156. 7t2t4t2256t2+2t1t225 In the following exercises, add. 157. 10v2v1+2v+412v In the following exercises, add. 158. 20w5w2+5w+625w In the following exercises, add. 159. 10x2+16x78x3+2x2+3x138x In the following exercises, add. 160. 6y2+2y113y7+3y23y+1773y In the following exercises, subtract. 161. z2+6zz2253z+2025z2 In the following exercises, subtract. 162. a2+3aa293a279a2 In the following exercises, subtract. 163. 2b2+30b13b2492b25b849b2 In the following exercises, subtract. 164. c2+5c10c216c28c1016c2 Sarah ran 8 miles and then biked 24 miles. Her biking speed is 4 mph faster than her running speed. If r represents Sarah’s speed when she ran, then her running time is modeled by the expression 8r and her biking time is modeled by the expression 24r+4 . Add the rational expressions 8r+24r+4 to get an expression for the total amount of time Sarah ran and biked.If Pete can paint a wall in p hours, then in one hour he can paint 1p of the wall. It would take Penelope 3 hours longer than Pete to paint the wall, so in one hour she can paint 1p+3 of the wall. Add the rational expressions 1p+1p+3 to get an expression for the part of the wall Pete and Penelope would paint in one hour if they worked together.Donald thinks that 3x+4x is 72x . Is Donald correct? Explain.Explain how you find the Least Common Denominator of x2+5x+4 and x216 .Find the LCD for 2x2x12 , 1x216 .Find the LCD for xx2+8x+15 , 5x2+9x+18 .Rewrite as equivalent rational expressions with denominator (x+3)(x4)(x+4) : 2x2x12 , 1x216 .Rewrite as equivalent rational expressions with denominator (x+3)(x+5)(x+6) : xx2+8x+15 , 5x2+9x+18 .

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