Many of the electronic components in the system unit reside on a circuit board called the microprocessor as shown in the accompanying figure. _________________________
src="data:image/png;base64,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
ANSWER:
False - motherboard
Education
src="data:image/png;base64,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
ANSWER:
False - motherboard
You might also like to view...
List the three Common Core anchor standards for the visual arts and suggest a visual arts activity for each
What will be an ideal response?
Which one of the following examples most clearly illustrates how mental set can interfere with problem solving?
a. A few days after an argument with her boyfriend, Abigail wants to make amends, but the boyfriend tells her that he is now dating someone else. b. Bernadette needs to calculate the volume of a pyramid. She knows she learned the correct formula in class, but she can't seem to remember it now. c. Corinne is working on a jigsaw puzzle. One of the pieces to the puzzle is missing. d. Danielle's car won't start. It doesn't occur to her that she can take the bus to work because she has always driven her car to work before.
Individually administered diagnostic tests are usually given to students by a special education teacher or a school psychologist
Indicate whether the statement is true or false
Withdrawing previously earned points for serious behavior is known as which of the following?
A) Direct appeals B) Response cost C) Reprimanding D) Negative attributions