Which of the following statements is a true statement about how children best learn?

What are three parts of the Behavioral Unit or the ABC model in behavioral psychology?

What will be an ideal response?

A group of 250 13-year-olds are split into three groups. One group acts as the control, whilst the others trial a new teaching pack. One group trials an online journal, and the other trials a hard-copy journal, with the aim of monitoring student writing development. Can linear variates be used to predict which group a participant selected at random belongs to?

A. Yes B. No C. It depends on the circumstances. D. Never

Under the normal curve, approximately what percentage of scores falls between ?1 and ?2 standard deviations below the mean?

a. 14% b. 34% c. 68% d. 95%

Many of the electronic components in the system unit reside on a circuit board called the microprocessor as shown in the accompanying figure. _________________________

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