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2 years ago

Explain the relationship between an inda vidual and a society

Mathematics

2 answers:

STALIN [3.7K]2 years ago

8 0

Answer:

The relation between individual and society is very close. Essentially, “society” is the regularities, customs and ground rules of antihuman behavior. ... Man is biologically and psychologically equipped to live in groups, in society. Society has become an essential condition for human life to arise and to continue.

Akimi4 [234]2 years ago

3 0

Answer:

The relation between individual and society is very close. ... The individual lives and acts within society but society is nothing, in spite of the combination of individuals for cooperative effort. On the other hand, society exists to serve individuals―not the other way around. Human life and society almost go together.

Step-by-step explanation:

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Answer:

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Step-by-step explanation:

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2 years ago

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Which expression is equivalent??? help!

dexar [7]

Answer:

The equivalent expression for the given expression $\sqrt[3]{256x^{10}y^{7} }$ is

$4x^{3} y^{2}(\sqrt[3]{4xy} )$

Step-by-step explanation:

Given:

$\sqrt[3]{256x^{10}y^{7} }$

Solution:

We will see first what is Cube rooting.

$\sqrt[3]{x^{3}} = x$

Law of Indices

$(x^{a})^{b}=x^{a\times b}\\and\\x^{a}x^{b} = x^{a+b}$

Now, applying above property we get

$\sqrt[3]{256x^{10}y^{7} }=\sqrt[3]{(4^{3}\times 4\times (x^{3})^{3}\times x\times (y^{2})^{3}\times y )} \\\\\textrm{Cube Rooting we get}\\\sqrt[3]{256x^{10}y^{7} }= 4\times x^{3}\times y^{2}(\sqrt[3]{4xy}) \\\\\sqrt[3]{256x^{10}y^{7} }= 4x^{3}y^{2}(\sqrt[3]{4xy})$

∴ The equivalent expression for the given expression $\sqrt[3]{256x^{10}y^{7} }$ is

$4x^{3} y^{2}(\sqrt[3]{4xy} )$

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2 years ago

What are the zeros of f(x)=x^2-10+25

BartSMP [9]

Answer:
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Explanation:
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3 years ago

A 250 mL beaker can hold 0.192 kg of acetone. What is the density of this substance, in g/mL? Round your answer to 3 significant

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Density = m/v with mass being in grams and volume in mL......
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3 years ago

Explain the relationship between an inda vidual and a society​

Explain the relationship between an inda vidual and a society