Question: Which of the following options correctly represents the degrees of comparison in the English language?
- Big – Bigger – Biggest
- Good – Well – Best
- Fast – Fastest – Faste
- Happy – Happest – Happier
Answer: A) Big – Bigger – Biggest
Degrees of Comparison Solution:
Degrees of comparison in the English language are used to compare the attributes of nouns, adjectives, or adverbs. They help us express differences in size, quality, or quantity. The correct sequence for degrees of comparison for the adjective “big” is as follows:
- Positive degree: Big
- Comparative degree: Bigger
- Superlative degree: Biggest
- Option A) “Big – Bigger – Biggest” is the correct representation of the degrees of comparison for the adjective “big.”
- Option B) “Good – Well – Best” is incorrect because “well” is an adverb, and the correct comparative form of “good” is “better.”
- Option C) “Fast – Fastest – Faste” contains a spelling error in the superlative degree (“Faste” should be “Fastest”).
- Option D) “Happy – Happest – Happier” contains spelling errors in both the comparative and superlative degrees (“Happest” should be “Happier,” and “Happier” should be “Happiest”).
Brief solution:
The comparative degree of an adjective is used to compare two things. In this case, we are comparing the intelligence of two people. The sentence is asking which person is smarter. The answer is smarter because it is the comparative form of the adjective smart.
Here are some other examples of comparative adjectives:
- tall – taller
- short – shorter
- fast – faster
- slow – slower
- big – bigger
- small – smaller
Trigonometry formulas are essential tools for solving problems in mathematics, particularly in geometry and physics. The primary trigonometric ratios are sine (sin), cosine (cos), and tangent (tan), which relate the angles of a triangle to the lengths of its sides. Key formulas include the Pythagorean identity, sin2θ+cos2θ=1, and the angle addition formulas: and cos(a+b)=cosa cosb−sina sinb\cos(a + b) = \cos a \cos b – \sin a \sin b. Mastering these trigonometry formulas is vital for success in advanced mathematics.
