General
General
Easy
Question
Identify the appositive sentence among the following
- My childhood friend, Melody, loved music.
- I was eating my favourite food.
- Geeta is enjoying music.
- Raju and Ravi are playing in the park.
The correct answer is: My childhood friend, Melody, loved music.
Explanation-An appositive is a noun or phrase that renames or describes the noun to which it is next. The same is seen in sentence a. Here friend is renamed as melody. Hence opt a is the correct answer.
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Maths-
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)
The graph of y=f(x) is shown in the xy-plane. What is the value of f(0) ?
![](data:image/png;base64,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)
The graph of y=f(x) is shown in the xy-plane. What is the value of f(0) ?
Maths-General
General
Identify past tense for the word ‘watch in’.
Identify past tense for the word ‘watch in’.
GeneralGeneral
General
Identify the synonym for the word ‘varying’.
Identify the synonym for the word ‘varying’.
GeneralGeneral
General
Which of the following words is a synonym of ‘plan’.
Which of the following words is a synonym of ‘plan’.
GeneralGeneral
General
Identify the synonym for the word ‘prompting’.
Identify the synonym for the word ‘prompting’.
GeneralGeneral
General
Which of the following sentence is an example of present participle?
Which of the following sentence is an example of present participle?
GeneralGeneral
General
Identify the definition of possessive plural noun among the following
Identify the definition of possessive plural noun among the following
GeneralGeneral
Maths-
a =
+
, b =
+
and c =
+
, then which of the following holds true?
i) c > a > b ii) a > b > c iii) a > c > b iv) b > a > c
Note:
This question can simply be solved by finding the values of all the square roots and then using them in finding the values of a, b and c and then their values can be easily compared.
a =
+
, b =
+
and c =
+
, then which of the following holds true?
i) c > a > b ii) a > b > c iii) a > c > b iv) b > a > c
Maths-General
Note:
This question can simply be solved by finding the values of all the square roots and then using them in finding the values of a, b and c and then their values can be easily compared.