Register now to access 7 million high quality study materials (What's Course Hero?) Course Hero is the premier provider of high quality online educational resources. With millions of study documents, online tutors, digital flashcards and free courseware, Course Hero is helping students learn more efficiently and effectively. Whether you're interested in exploring new subjects or mastering key topics for your next exam, Course Hero has the tools you need to achieve your goals.

1 Page

lab 24 electric current

Course: PHYSICS 1A+1B, Fall 2010
School: Laney College
Rating:

Document Preview

diff(V) 1 0.6 0.004 2 2.5 0.016 3 7.2 0.047 4 39.6 0.26 5 59.2 0.39 6 95.2 0.628 7 127.9 0.837 8 170.7 1.086 V current(ma) Poten vs I 1.2 Current (ma) Pot Dif (V) Current (ma) 4.4 10.3 13.1 19.3 22.3 25 33.3 46 51 102.4 117.1 122.5 132.6 140.3 153.2 162.3 171.3 4.4 f(x) = 0.0064303217x + 0.0042739015 R = 0.9995104236 1 0.8 U ( v) 0.6 U vs I 0.9 0.4 f(x) = 0.01185729181.0252919436^x 0.8 0.9 =...

Register Now

Unformatted Document Excerpt

Coursehero >> California >> Laney College >> PHYSICS 1A+1B

Course Hero has millions of student submitted documents similar to the one
below including study guides, practice problems, reference materials, practice exams, textbook help and tutor support.

Course Hero has millions of student submitted documents similar to the one below including study guides, practice problems, reference materials, practice exams, textbook help and tutor support.
diff(V) 1 0.6 0.004 2 2.5 0.016 3 7.2 0.047 4 39.6 0.26 5 59.2 0.39 6 95.2 0.628 7 127.9 0.837 8 170.7 1.086 V current(ma) Poten vs I 1.2 Current (ma) Pot Dif (V) Current (ma) 4.4 10.3 13.1 19.3 22.3 25 33.3 46 51 102.4 117.1 122.5 132.6 140.3 153.2 162.3 171.3 4.4 f(x) = 0.0064303217x + 0.0042739015 R = 0.9995104236 1 0.8 U ( v) 0.6 U vs I 0.9 0.4 f(x) = 0.01185729181.0252919436^x 0.8 0.9 = 0.9569619789 R f(x) = 0.01185729181.0252919436^x 0.7 0.8 = R 0.9569619789 0.7 0.6 0.6 0.5 0.5 0.2 0 0 20 0.4 0.4 0.3 0.3 0.2 80 100 120 0.1 0 0 0 0 13.1 60 0.2 0.1 10.3 40 I (ma) Column A Exponential Regression for Column A U ( V) Pot Dif (V) 0.005 0.012 0.015 0.022 0.026 0.029 0.039 0.056 0.062 0.149 0.19 0.217 0.279 0.374 0.583 0.71 0.825 19.3 20 20 40 22.3 40 60 60 80 25 80 100 100 120 I 140 160 (ma) 33.3 46 120 140 160 180 180 51 102.4 117.1 122.5 132.6 140.3 140 160 180
Find millions of documents on Course Hero - Study Guides, Lecture Notes, Reference Materials, Practice Exams and more. Course Hero has millions of course specific materials providing students with the best way to expand their education.

Below is a small sample set of documents:

Berkeley - EE 105 - EE105
Lecture 2OUTLINE Semiconductor BasicsReading: Chapter 2EE105 Fall 2011Lecture 2, Slide 1Prof. Salahuddin, UC BerkeleyAnnouncement Office Hours for tomorrow is cancelled(ONLY for this week)There will be office hours on Friday (2P-3P)(ONLY for th
Berkeley - EE 105 - EE105
Lecture 4OUTLINE PN Junction Diodes Electrostatics Capacitance I/V Reverse Breakdown Large and Small signalmodelsReading: Chapter 2.2-2.3,3.2-3.4EE105 Fall 2010Lecture 4, Slide 1Prof. Salahuddin, UC BerkeleyEnergy Band DescriptionEE105 Fall
Berkeley - EE 105 - EE105
Lecture 5OUTLINE PN Junction Diodes I/V Capacitance Reverse Breakdown Large and Small signalmodelsReading: Chapter 2.2-2.3,3.2-3.4EE105 Fall 2011Lecture 5, Slide 1Prof. Salahuddin, UC BerkeleyRecap: Law of the JunctionLaw of the junction:n(a
Berkeley - EE 105 - EE105
EE105Microelectronic Devices andCircuitshttp:/wwwinst.eecs.berkeley.edu/~ee105Prof. Sayeef Salahuddinsayeef@eecs.berkeley.edu515 Sutardja Dai HallTeaching StaffSayeef SalahuddinProfessor@ Berkeley since Fall 2008Courses: EE 230, EE105Office Hou
Berkeley - EE 105 - EE105
EE-105-Fall-2011COURSE SYLLABUS AND TENTATIVE SCHEDULE FALL 2010WeekDayLectureDate1118/25Introduction. Basic Semiconductor Physics: charge carriers, doping,1, 2.12228/302.2339/1carrier drift &amp; diffusion.pn Junction Diodes: electrostat
The Chinese University of Hong Kong - MATHEMATIC - MAT2310
THE DIHEDRAL GROUPS DnSome authors use D2n to denote the n-th dihedral group. An excellent referencefor dihedral groups is the textbook Algebra by Michael Artin, Chapter 5.Let n 3. Let Dn be the set of all symmetries of a regular n-gon. More precisely,
The Chinese University of Hong Kong - MATHEMATIC - MAT2310
The Chinese University of Hong Kong - MATHEMATIC - MAT2310
The Chinese University of Hong Kong - MATHEMATIC - MAT2310
The Chinese University of Hong Kong - MATHEMATIC - MAT2310
The Chinese University of Hong Kong - MATHEMATIC - MAT2310
The Chinese University of Hong Kong - MATHEMATIC - MAT2310
The Chinese University of Hong Kong - MATHEMATIC - MAT2310
The Chinese University of Hong Kong - MATHEMATIC - MAT2310
The Chinese University of Hong Kong - MATHEMATIC - MAT2310
The Chinese University of Hong Kong - MATHEMATIC - MAT2310
The Chinese University of Hong Kong - MATHEMATIC - MAT4033
The Chinese University of Hong Kong - MATHEMATIC - MAT4033
The Chinese University of Hong Kong - MATHEMATIC - MAT4033
The Chinese University of Hong Kong - MATHEMATIC - MAT4033
The Chinese University of Hong Kong - MATHEMATIC - MAT4033
The Chinese University of Hong Kong - MATHEMATIC - MAT4033
The Chinese University of Hong Kong - MATHEMATIC - MAT4033
The Chinese University of Hong Kong - MATHEMATIC - MAT4033
The Chinese University of Hong Kong - MATHEMATIC - MAT4033
The Chinese University of Hong Kong - MATHEMATIC - MAT4033
The Chinese University of Hong Kong - MATHEMATIC - MAT4033
The Chinese University of Hong Kong - MATHEMATIC - MAT4033
The Chinese University of Hong Kong - MATHEMATIC - UGEB2530A
The Chinese University of Hong Kong - MATHEMATIC - UGEB2530A
The Chinese University of Hong Kong - MATHEMATIC - UGEB2530A
The Chinese University of Hong Kong - MATHEMATIC - UGEB2530A
The Chinese University of Hong Kong - MATHEMATIC - UGEB2530A
The Chinese University of Hong Kong - MATHEMATIC - UGEB2530A
The Chinese University of Hong Kong - MATHEMATIC - UGEB2530A
The Chinese University of Hong Kong - MATHEMATIC - UGEB2530A
The Chinese University of Hong Kong - MATHEMATIC - UGEB2530A
The Chinese University of Hong Kong - MATHEMATIC - UGEB2530A
The Chinese University of Hong Kong - MATHEMATIC - UGEB2530A
The Chinese University of Hong Kong - MATHEMATIC - UGEB2530A
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210
The Chinese University of Hong Kong - MATHEMATIC - MATH4210