As shown in the accompanying figure, a(n) ____________________ is a type of optical disc that uses the same laser technology that audio CDs use for recording music.
src="data:image/png;base64,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
ANSWER:
compact disk read-only memory
CD-ROM
CD-ROM (compact disk read-only memory)
compact disk read-only memory (CD-ROM)
You might also like to view...
The research findings on ability grouping discussed in the text suggest that
a. between-class ability grouping is most beneficial to low-achieving students. b. within-class ability grouping is not effective for the primary and elementary grades. c. there is no empirical support for between-class ability grouping. d. between-class ability grouping works in conjunction with the Joplin Plan.
The process by which we learn the ways of a given society or social group so that we can function within it
A. education B. socialization C. development
How much time should be allocated for daily reading in school?
a. 30 minutes b. 45 minutes c. 60 minutes d. 90 minutes
A picture schedule, music or riddles can be used as
A. motivational tools B. transition tools C. scheduling variety tools D. behavior management tools