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HomьЅСG П%bjbjŽйŽй !<ьГьГ€џџџџџџ]АААААААФФФФФ4ј$ФQђ((((((((<<<<<<<Cє7<А(((((77АА(((((( А(А((((((((((((((АА( рˆ•њМФФ2 MATH 095 Fall 2004 Course Syllabus Instructor: Benjamin Van Dyke e-mail: benjamin.vandyke@wwcc.edu Office Hours: 2:30-3:30 daily and by appointment Course Credits: 5 Required Text: Intermediate Algebra, second ed., Tussy and Gustafson Course Description and Objectives The second of a two-course series covering the basics of algebra (MATH 065/095). Topics for the course include: working with algebraic expressions (polynomial, algebraic fractions, radicals, exponential, logarithmic), solving equations and inequalities (polynomial, rational, radical, exponential, logarithmic), solving systems of linear equations, an introduction to functions, and graphing functions/relations (linear, quadratic, simple conics, exponential, logarithmic). Prerequisites and Class Policy A grade of C- or higher in MATH 065 or MATH 065B, a satisfactory placement score or permission of the Mathematics Department is required to enroll in this class. Students are expected to attend class every day and arrive on time. Homework Each homework assignment is worth 10 points (with all work shown). The total homework score for the course will be based upon a 100 point scale. Homework is due at the beginning of class every Friday. The list of homework problems should be attached to the back of this syllabus. Quizzes Quizzes will be given periodically throughout the course as a means of practice and to test knowledge on the current section. Each quiz will be worth up to 5 points, with partial credit given for demonstration of knowledge. The total quiz score for the course will be based upon a 50 point scale. Exams Four midterm exams will be given during the course and a cumulative final exam will be given at the end of the course. Each midterm exam is worth 100 points and the final exam is worth 150 points. No makeup exams will be given. If a midterm exam is missed for an extreme circumstance, then your final grade will be based upon the remaining exams. Grading Procedure Grading Scale Homework 100 pts 700-630 points A Quizzes 50 pts 629-560 points B Midterm Exams 400 pts 559-490 points C Final Exam 150 pts 489-420 points D Total 700 pts 0-419 points F Special Services and Student Accommodations If you have a disability and need accommodations, please see me after class or contact La Dessa Smelcer, the Disabilities Coordinator. This syllabus is subject to change during the course, depending on the needs of the class and instructor. List of Homework Problems Section Problems assigned 2.1 1-20 all, 21-57 every other odd 2.2 1-6 all, 7-11 odd, 15-63 every other odd 2.3 1-8 all, 13-57 every other odd 2.4 1-6 all, 7-13 odd, 17-69 every other odd 2.5 1-8 all, 9-83 every other odd 3.1 1-6 all, 7-39 every other odd, 47,53 3.2 1-4 all, 5-53 every other odd 3.3 1-7 all, 11-31 odd 4.1 1-8 all, 9-53 every other odd 4.2 1-8 all, 9-61 every other odd 4.3 1-10 all, 11-85 every other odd 4.4 1-4 all, 5-33 odd 5.1 1-12 all, 13-93 every other odd 5.3 1-8 all, 9-67 every other odd 5.4 1-8 all, 9-97 every other odd 5.5 1-6 all, 7-91 every other odd 5.6 1,2,3-67 every other odd 5.7 1-4 all, 9-89 every other odd 5.8 1-10 all, 11-43 every other odd 5.9 1-6 all, 7-51 every other odd 6.1 1-4 all, 5-73 every other odd 6.3 1-8 all, 9-57 every other odd 6.4 1-8 all, 11-75 every other odd 6.5 1,2,5-57 every other odd 6.6 1-4 all, 5-57 every other odd 6.7 1-6 all, 7-11 odd, 15-55 every other odd 7.1 1-16 all, 17-33 every other odd, 39-95 every other odd 7.2 1-6 all, 7-91 every other odd 7.3 1-6 all, 7-95 every other odd 7.4 1-4 all, 5-65 every other odd 7.5 1-4 all, 9-14 all, 15-79 every other odd, 87-111 every other odd 8.1 1-4 all, 7-63 every other odd 8.2 1,2,3-39 every other odd 8.3 1-4 all, 5-45 every other odd 8.4 1-12 all, 19-107 every other odd 8.5 1-6 all, 7-51 every other odd 9.1 1-8 all, 9-61 every other odd 9.2 1-10 all, 11-55 every other odd 9.3 1-8 all, 9-16 odd, 21-31 odd 9.4 1-11 all, 15,19-23 odd, 31,39 9.5 1-12 all, 13-85 every other odd 9.6 1,2,5-10 all, 15,16,19-33 odd, 9.7 1-15 all, 19-31 odd, 39-63 every other odd 9.8 1,2,5,7,11-43 every other odd, 49-81 every other odd NPfžжиђbd€„Ќ№ђ46ѓшмбХКЏЃ˜vj_TF9OJQJCJnHsH tH5OJQJCJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJ>*nHsH tHOJQJnHsH tH5OJQJnHsH tHOJQJnHsH tHOJQJnHsH tH5OJQJnHsH tHOJQJnHsH tHOJQJnHsH tH5OJQJnHsH tHOJQJnHsH tH5OJQJnHsH tHOJQJnHsH tHOJQJCJ$nHsH tH6ъ ь ( * . p і ј њ BRЈЊДЖѓциЫРГЇœ‘ƒvk]RG;0OJQJnHsH tH5OJQJnHsH tHOJQJnHsH tHOJQJnHsH tH5OJQJCJnHsH tHOJQJnHsH tHOJQJCJnHsH tH5OJQJCJnHsH tHOJQJnHsH tHOJQJnHsH tH5OJQJnHsH tHOJQJCJnHsH tHOJQJnHsH tHOJQJCJnHsH tH5OJQJCJnHsH tHOJQJCJnHsH tHOJQJCJnHsH tHЖprtИКRІъbdКМlЬЮѕшкЬПДЉž’‡|qcWLA6OJQJnHsH tHOJQJnHsH tHOJQJnHsH tH5OJQJnHsH tH5OJQJCJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJ>*nHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJCJnHsH tH5OJQJCJnHsH tH5OJQJCJnHsH tHOJQJCJnHsH tHOJQJnHsH tHЮЂжи VВњVœ№6fЌђ<jДњѕчйЮУИ­Ђ—Œvk`UJ?4OJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tH5OJQJCJ$nHsH tH5OJQJCJ$nHsH tHOJQJnHsH tHњ@†ТR˜о$lЈюJТ N ” !f!ѕъпдЩОГЈ’‡|qf[PE:OJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHf!Ђ!ш!4"z"Р" #N#”#о#($ˆ$ќ$ў$%ѕъпдЩОГЈ’‡|qfOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHOJQJnHsH tHNPжиbd№ђ6ъ ь * ј њ BRЈЊЖrtКќњјієђ№юыщчфтрнлиждбЯЬЪ$$$$$$$КRІbdМlЬЮЂжи VВњVœ№6fЌ§ћљїѕѓ№юьъшхтромкиждваЮ$$$Ќђ<jДњ@†ТR˜о$lЈюJТ N ” !f!Ђ!§ћљїѕѓёяэыщчхуспнлйзегбЯЂ!ш!4"z"Р" #N#”#о#($ˆ$ќ$ў$%§ћљїѕѓёяэыщчх NPжиbd№ђ6ъ ь * ј њ BRЈЊЖrtКRІbdМlЬЮЂжи VВњVœ№6fЌђ<jДњ@†ТR˜о$lЈюJТ N ” !f!Ђ!ш!4"z"Р" #N#”#о#($ˆ$ќ$ў$%S [ `ёџ CopymH A@ђџЁ&\`ђ&DefaultCJ(]@( Default SSCJ(^`ё( Default TB,_`ё",Header$5CJ``ё2Body(a`ёB(Footer$6(b`ёR(FootnoteCJ0c@a0Footnote IndexH*€<џџџџ6ЖЮњf!%КЌЂ!%%‚‚€@GTimes New Roman5Symbol3Arial;Helvetica"AŒаh*‹&+‹&ƒ!ЅРДД€0F0Аа/ Ар=!А "А # $ %А