Elementary Algebra 17th Edition
ISBN: 9780998625713
Author: Lynn Marecek, MaryAnne Anthony-Smith
Publisher: Lynn Marecek, MaryAnne Anthony-Smith
1 Foundations 2 Solving Linear Equations And Inequalities 3 Math Models 4 Graphs 5 Systems Of Linear Equations 6 Polynomials 7 Factoring 8 Rational Expressions And Equations 9 Roots And Radicals 10 Quadratic Equations Chapter6: Polynomials
6.1 Add And Subtract Polynomials 6.2 Use Multiplication Properties Of Exponents 6.3 Multiply Polynomials 6.4 Special Products 6.5 Divide Monomials 6.6 Divide Polynomials 6.7 Integer Exponents And Scientific Notation Chapter Questions Section6.6: Divide Polynomials
Problem 6.153TI: Find the quotient: 8z2+244 Problem 6.154TI: Find the quotient: 18z2279 Problem 6.155TI: Find the quotient: (27b233b2)3b Problem 6.156TI: Find the quotient: (25y355y2)5y . Problem 6.157TI: Find the quotient: 25y215y5 Problem 6.158TI: Find the quotient: 42b218b6 Problem 6.159TI: Find the quotient: 60d7+24d54d3 Problem 6.160TI: Find the quotient: 216p748p56p3 Problem 6.161TI: Find the quotient: (32a2b16ab2)(8ab) . Problem 6.162TI: Find the quotient: (48a8b436a6b5)(6a3b3) . Problem 6.163TI: Find the quotient: 40x3y2+24x2y216x2y38x2y Problem 6.164TI: Find the quotient: 35a4b2+14a4b242a2b47a2b2 Problem 6.165TI: Find the quotient: 18c2+6c96c Problem 6.166TI: Find the quotient: 10d25d25d Problem 6.167TI: Find the quotient: (y2+10y+21)(y+3) . Problem 6.168TI: Find the quotient: (m2+9m+20)(m+4) Problem 6.169TI: Find the quotient: (2x23x20)(x4) . Problem 6.170TI: Find the quotient: (3x216x12)(x6) . Problem 6.171TI: Find the quotient: (x3+5x2+8x+6)(x+2) . Problem 6.172TI: Find the quotient: (2x3+8x2+x8)(x+1) . Problem 6.173TI: Find the quotient: (x3+3x+14)(x+2) . Problem 6.174TI: Find the quotient: (x43x31000)(x+5) . Problem 6.175TI: Find the quotient: (x364)(x4) . Problem 6.176TI: Find the quotient: 25x38)(5x2) . Problem 442E: In the following exercises, divide each polynomial by the monomial. 442. 45y+369 Problem 443E: In the following exercises, divide each polynomial by the monomial. 443. 30b+755 Problem 444E: In the following exercises, divide each polynomial by the monomial. 444. 8d24d2 Problem 445E: In the following exercises, divide each polynomial by the monomial. 445. 42x214x7 Problem 446E: In the following exercises, divide each polynomial by the monomial. 446. (16y220y)4y Problem 447E: In the following exercises, divide each polynomial by the monomial. 447. (55w210w)5w Problem 448E: In the following exercises, divide each polynomial by the monomial. 448. (9n4+6n3)3n Problem 449E: In the following exercises, divide each polynomial by the monomial. 449. (8x3+6x2)2x Problem 450E: In the following exercises, divide each polynomial by the monomial. 450. 18y212y6 Problem 451E: In the following exercises, divide each polynomial by the monomial. 451. 20b212b4 Problem 452E: In the following exercises, divide each polynomial by the monomial. 452. 35a4+65a25 Problem 453E: In the following exercises, divide each polynomial by the monomial. 453. 51m4+72m33 Problem 454E: In the following exercises, divide each polynomial by the monomial. 454. 310y4200y35y2 Problem 455E: In the following exercises, divide each polynomial by the monomial. 454. 412z848z54z3 Problem 456E: In the following exercises, divide each polynomial by the monomial. 456. 46x338x22x2 Problem 457E: In the following exercises, divide each polynomial by the monomial. 457. 51y4+42y23y2 Problem 458E: In the following exercises, divide each polynomial by the monomial. 458. (24p233p)(3p) Problem 459E: In the following exercises, divide each polynomial by the monomial. 459. (35x421x)(7x) Problem 460E: In the following exercises, divide each polynomial by the monomial. 460. (63m442m3)(7m2) Problem 461E: In the following exercises, divide each polynomial by the monomial. 461. (48y424y3)(8y2) Problem 462E: In the following exercises, divide each polynomial by the monomial. 462. (63a2b3+72ab4)(9ab) Problem 463E: In the following exercises, divide each polynomial by the monomial. 463. (45x3y4+60xy2)(5xy) Problem 464E: In the following exercises, divide each polynomial by the monomial. 464. 52p5q4+36p4q364p3q24pq Problem 465E: In the following exercises, divide each polynomial by the monomial. 465. 49c2d270c3d335c2d47cd2 Problem 466E: In the following exercises, divide each polynomial by the monomial. 466. 66x3y2110x2y344x4y311x2y2 Problem 467E: In the following exercises, divide each polynomial by the monomial. 467. 72r5s2+132r4s396r3s512r2s2 Problem 468E: In the following exercises, divide each polynomial by the monomial. 468. 4w2+2w52w Problem 469E: In the following exercises, divide each polynomial by the monomial. 469. 12q2+3q13q Problem 470E: In the following exercises, divide each polynomial by the monomial. 470. 10x2+5x45x Problem 471E: In the following exercises, divide each polynomial by the monomial. 471. 20y2+12y14y Problem 472E: In the following exercises, divide each polynomial by the monomial. 472. 36p3+18p212p6p2 Problem 473E: In the following exercises, divide each polynomial by the monomial. 473. 63a3108a2+99a9a2 Problem 474E: In the following exercises, divide each polynomial by the monomial. 474. (y2+7y+12)(y+3) Problem 475E: In the following exercises, divide each polynomial by the monomial. 475. (d2+8d+12)(d+2) Problem 476E: In the following exercises, divide each polynomial by the monomial. 476. (x23x10)(x+2) Problem 477E: In the following exercises, divide each polynomial by the monomial. 477. (a22a35)(a+5) Problem 478E: In the following exercises, divide each polynomial by the monomial. 478. (r212t+36)(t6) Problem 479E: In the following exercises, divide each polynomial by the monomial. 479. (x214x+49)(x7) Problem 480E: In the following exercises, divide each polynomial by the monomial. 480. (6m219m20)(m4) Problem 481E: In the following exercises, divide each polynomial by the monomial. 481. (4x217x15)(x5) Problem 482E: In the following exercises, divide each polynomial by the monomial. 482. (q2+2q+20)(q+6) Problem 483E: In the following exercises, divide each polynomial by the monomial. 483. (p2+11p+16)(p+8) Problem 484E: In the following exercises, divide each polynomial by the monomial. 484. (y23y15)(y8) Problem 485E: In the following exercises, divide each polynomial by the monomial. 485. (x2+2x30)(x5) Problem 486E: In the following exercises, divide each polynomial by the binomial. 486. (3b3+b2+2)(b+1) Problem 487E: In the following exercises, divide each polynomial by the binomial. 487. (2n310n+24)(n+3) Problem 488E: In the following exercises, divide each polynomial by the binomial. 488. (2y36y36)(y3) Problem 489E: In the following exercises, divide each polynomial by the binomial. 459. (7q35q2)(q1) Problem 490E: In the following exercises, divide each polynomial by the binomial. 490. (z3+1)(z+1) Problem 491E: In the following exercises, divide each polynomial by the binomial. 491. (m3+1000)(m+10) Problem 492E: In the following exercises, divide each polynomial by the binomial. 492. (a3125)(a5) Problem 493E: In the following exercises, divide each polynomial by the binomial. 493. (x3216)(x6) Problem 494E: In the following exercises, divide each polynomial by the binomial. 494. (64x327)(4x3) Problem 495E: In the following exercises, divide each polynomial by the binomial. 495. (125y364)(5y4) Problem 496E: Average cost Pictures Plus produces digital albums. The company’s average cost (in dollars) to make... Problem 497E: Handshakes At a company meeting, every employee shakes hands with every other employee. The number... Problem 498E: James divides 48y+6 4 by 6 this way : 48y+66=48y . What is wrong with his reasoning? Problem 499E: Divide 10x2+x122x and explain with words how you get each term of the quotient. Problem 6.167TI: Find the quotient: (y2+10y+21)(y+3) .
Related questions
Evaluate the integral using techniques of integration : substitution techniques and integration by partial fraction
Transcribed Image Text: B dy
(2y+12) vytA
With differentiation, one of the major concepts of calculus. Integration involves the calculation of an integral, which is useful to find many quantities such as areas, volumes, and displacement.
Expert Solution
This question has been solved!
Explore an expertly crafted, step-by-step solution for a thorough understanding of key concepts.
Step by step
Solved in 2 steps
