Answer:
Festivals were also held in ancient Rome in response to particular events, or for a particular purpose such as to propitiate or show gratitude toward the gods. The rituals consisted of festivals, offerings (often of food or wine), and animal sacrifices. These rituals had to be carried out regularly and correctly in order to retain the favor of the gods towards the state, household, or individual.
Explanation:
Answer: 1) scientific revolution that preceded industrial revolution and which took place in the European Nortwest (science free of religious dogmatism), 2) progressive rational/empiric philosophy of Enlightenment (economic and consequently also political liberalism), 3) free access to raw materials in colonies (Africa, Americas and Asia).
Explanation: Scientic revolution introduced (not completely but almost completely) a mechanistic and materialistic metaphor of the world....so in the 19th century this perspective became predominant (soon after it was an organicist/Darwinian perspective), Enlightenment questioned divine rights of royal power (medieval and ancient idea) and introduced rights of man and consequently idea of society free of all economic and political limitations and then there were vast lands oveseas that could supply necessary material. What makes part of all that is French revolution, first machines and slavery (which abolished during the 19th century).
Answer:
The answer is D.
Explanation:
The Korean War was the 1st battle of the Cold War, and 1st major proxy war fought between the US and a Soviet communist supported enemy. A proxy war occurs when one or more opposing powers instigates a war and then uses 3rd parties to fight on their behalf.
Religion (mostly Christianity)
A Linear inequality with a variable is the type of inequality, where they are real numbers. If, the linear linear is also called first degree inequality.
In general, to solve any system of inequalities, we trace, in the same coordinate system, the region that represents the solution of each of the inequalities that make up the system. The system solution will then be given by the intersection of these regions. The following two scenes show examples of systems of inequalities involving linear and quadratic inequalities.
