C. boxes and arrows <3
A flowchart proof uses boxes and arrows to visually represent a logical argument in a step-by-step manner. Each step in the argument is in a box, and arrows are used to show the logical connections between steps.
A flowchart proof presents a logical argument using C. boxes and arrows. This method of proving concepts in mathematics often involves step-by-step illustrations of a logical argument where each step is represented by a box and the connections between different steps are represented by arrows. It's a visual way of demonstrating how one step leads to another until the logical conclusion is reached.
For instance, consider a disjunctive syllogism, which is a common argument form in logic. If you were to present this in a flowchart, you would have boxes representing the premises 'If X, then Y' and 'Not X', with arrows leading from these to the conclusion 'Therefore, Y'.
Using flowchart proofs can be particularly helpful in deciphering complex arguments as they provide a clear, visual representation of the logical structure and sequence of an argument.
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Identify the phrase in bold.
A.
infinitive phrase
B.
participial phrase
C.
gerund phrase
D.
verb phrase
A news article
A banner
An editorial
B. June was a collector of memorabilia.
C. I shall be all that I am and more.
D. The crowed roared as the bull charged.
Which word in the passage above is used to create a feeling of dread?
laughed
flashed
gesticulation
grotesque
Answer:
The answer is grotesque
Explanation:
shop + -er
limit + -ed
fear + -ing