Answer:
I think its Symmetric Property.
Step-by-step explanation:
Answer:
A. Division property of inequality
Step-by-step explanation:,
If a, b and c are any real numbers,
By the division property of inequality,
a = b ⇒
,
By the inverse property of multiplication,

where, 1 is multiplication identity.
By the subtraction property of inequality,
a = b ⇒ a - c = b - c
By transitive property of inequality,
a = b and b = c ⇒ a = c,
Thus, it is clear that,
Division property of inequality is used in step 4.
Option A is correct.
Incomplete question. The full question read;
Provide the missing category labels from Maslow's theory for the following work scenarios, and answer the related question on Alderfer's theory.
Work Example
- Getting along with coworkers and bosses
Maslow's Need Category ____
Alderfer's ERG Theory Alderfer renamed the need for getting along with coworkers and bosses into the ______category of needs.
- Getting a promotion for a job well done
Maslow's Need Category ____
- Securing another position after being let go from a previous job
Maslow's Need Category ____
Answer:
- <u>Maslow's Need Category = love and belonging need (social belonging need); Alderfer's ERG Theory renamed to relatedness</u>
- <u>Self-esteem need</u>
- <u>Safety need</u>
<u>Step-by-step explanation:</u>
According to Maslow's hierarchy of needs, in a scenario where someone (including a worker) is able to get along with coworkers and bosses, they have achieved the social belonging need.
Alderfer after studying Maslow's hierarchy decided to rename or in other categorize the social belonging need to "<u>Relatedness"</u>. In other words, the individual has a need to be<em> "related,"</em> <em>"to belong." </em>
<em>While "</em>getting a promotion for a job well done" in Maslow's hierarchy falls under the self-esteem need which is best illustrated when the individual has received recognition, a prize, and the likes.
Achieving Job security also falls under Maslow's safety need. That is why we can categorize "securing another position after being let go from a previous job' as belonging to the "Safety need".
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Answer:
Step-by-step explanation:
Solving Exponential Equations with Different Bases.
Step 1: Determine if the numbers can be written using the same base. If so, stop and use Steps for
Solving an Exponential Equation with the Same Base. If not, go to Step 2.
Step 2: Take the common logarithm or natural logarithm of each side.
Step 3: Use the properties of logarithms to rewrite the problem. Specifically, use Property 5 which
says
Step 4: Divide each side by the logarithm.
Step 5: Use a calculator to find the decimal approximation of the logarithms.
Step 6: Finish solving the problem by isolating the variable.