Step 1: Create Multi-page PDF Create 3 pages. Number pages…
Step 1: Create Multi-page PDF Create 3 pages. Number pages in upper right or left corner. Write clearly so text can be easily read. Page 1: Write AND Print your first and last name on a piece of paper. Page 2: Write “2 + 2 = 4”. Page 3: Write “Half of 10 is 5”. Scan the three pages using your smart phone, tablet, scanner or a mobile scan app (i.e., CamScanner, Tiny Scanner, Adobe Scan, etc.). How to scan documents on your iPhone or iPad Scan documents with Google Drive (especially Android) Use Merge PDF or Combine PDF to quickly and easily combine multiple PDF files into a single document. Save the file as a PDF (remember where it is being saved). Use the naming convention “Last Name, First Name, MTH xxx Practice Submit”. Note: “xxx” is the number of this math course. Step 2: Upload Saved PDF Click on the “Choose A File” button. Click on the handwritten notes document you created & saved. Click on the “Open” button. The document name will appear in the text box. Click the “Submit Quiz” button to submit your handwritten notes document.
Read DetailsCreate a pdf of your written assessment work. Use a scanner…
Create a pdf of your written assessment work. Use a scanner to scan each page (in order) OR download and use a mobile scan app (i.e., Tiny Scanner, AdobeScan, Fast Scanner, etc.) to take a picture of each page (in order) to save the file as a pdf. Use the naming convention “Last Name, First Name MTH 265 Handwritten Quiz 2.” Upload file. Click on the “Browse for Local File” button. Click on the document you created & click on the Open button. Click the Submit button to submit your quiz for grading.
Read DetailsQuestion 3 (10 points) This is a two-part problem. Answer B…
Question 3 (10 points) This is a two-part problem. Answer BOTH parts. i. Suppose (1,1) is a critical point of a function with continuous second derivatives. Given the following information what can you say about ? (Hint: Use the information to assess for Local Extrema & Saddle Points) ii. Evaluate the iterated integral.
Read Details