Answer:
This is not an example of a high-quality PLAAFP statement.
Explanation:
PLAAFP statement is the term that refers to a student's academic performance levels and functional performance levels, that is, the PLAAFP shows the student's quality levels in relation to their ability to respond positively to academic concepts, such as reading correctly, understand complex subjects, but suitable for their academic level, write correctly and be able to do operations and school activities. The PLAAFP statement is very useful as it serves as a basis for presenting teachers and education professionals how a particular student should be monitored to strengthen their academic weaknesses.
The case shown in the question above presents a student with great difficulty in reading and understanding what he is reading. In this case, this student has a low quality of PLAAFP statement and this serves to encourage teachers to read and make this student overcome this difficulty.
Answer:
A. Culture
Explanation:
Culture is transmitted across generations and influences our actions including how a person gathers information in a class.
Answer:
A. Learned helplessness
Explanation:
This is a mental condition in which an animal or individual accepts a bad condition and believes there is no control or solution to it due to excessive exposure. The individual believes there is little or no hope to break free from the condition and willingly surrenders without putting up a fight.
The answer is 8 types
Those 8 types of intelligence according to howard Gardner are: <span> musical-rhythmic, visual-spatial, verbal-linguistic, logical-mathematical, bodily-kinesthetic, interpersonal, intrapersonal, and naturalistic.
This difference make people tend to be excel at a certain things while performing poorly on the others</span>
Answer:
Explanation:
Just so you understand more deeply. There is more than one answer for this question, "as it is written". Math can be like this sometimes. And it can cause a lot of confusion. You must read it very carefully. If you multiply 8 x 4 you get 32. You know that (? x 7) must be greater that that number because you subtract (? x 3). If you multiply 5 x 7 you get 35. And that is greater than 32. Then take 32 from 35 to get 3. So that (5 x 7) - (1 x 3) also gives 32. If ? is assumed to be the same value for both (? x 7) and (? x 3). Then the problem can be solved by the rules of algebra, as it was done by Vivian. Any other analysis can give you other possible answers. If this is the case, then there must be some more to the question. You are not told that ? = ?. But this must be the case. And ? is an "operator", not just a question mark. To get just one answer, they must both be 8. You just use the "math rules" to move things around until you find the way to the answer. Scientists sometimes do this for months or years to solve complicated problems.
Often, your number sense gets confused by this kind of "discrepancy" or not knowing where to start situation, when you go beyond simple math and into algebra concepts. And this can leave you lost and not knowing where to start. If the general question is put to you to solve the problem by algebra concepts. You can assume more into the question by applying the rules of algebra. In algebra, symbols are used instead of numbers. This is part of the "math rules". Then the other rules are used to find the answer. The symbol ? is just as valid as x or y or whatever. In science you sometimes even use words. (That is how word problems are built.) Once you know the "math rules". You can apply logic to solve math problems.
I send this answer to give you a deeper understanding of what you are doing. You are learning basic rules now. Knowing what is causing your confusion can make things easier in the future. Jut play with the "ok" math maneuvers (+, -, multiplication, division) until you can do them without thinking. And math will become easy. There are more "math rules" that you will learn later. You will "see" the answers easier later. After you get more experience. Don't expect this now. The key to easy math is practice.
