Chemistry-
General
Easy
Question
The IUPAC name for
![](data:image/png;base64,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)
- 1-Chloro-2-nitro-4-methylbenzene
- 1-Chloro-4-methyl-2-nitrobenzene
- 2-Chloro-1-nitro-5-methylbenzene
- m-Nitro-p-chlorotoluene
The correct answer is: 1-Chloro-4-methyl-2-nitrobenzene
1, chore 4 - methyl 2 - nitro benzene
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The IUPAC name of ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/473697/1/942420/Picture70.png)
The IUPAC name of ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/473697/1/942420/Picture70.png)
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The IUPAC name of the compound shown below is ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/473696/1/942419/Picture69.png)
The IUPAC name of the compound shown below is ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/473696/1/942419/Picture69.png)
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The IUPAC name of the compound ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/473692/1/942418/Picture65.png)
The IUPAC name of the compound ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/473692/1/942418/Picture65.png)
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Which of the following compounds has wrong IUPAC name?
Which of the following compounds has wrong IUPAC name?
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What is the IUPAC name of ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/473684/1/942381/Picture61.png)
What is the IUPAC name of ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/473684/1/942381/Picture61.png)
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If
then
=
If
then
=
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-2 tan
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If
-2 tan
then
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If
and
,then ![fraction numerator p over denominator sin invisible function application ϕ end fraction minus fraction numerator q over denominator cos invisible function application ϕ end fraction equals](data:image/png;base64,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)
If
and
,then ![fraction numerator p over denominator sin invisible function application ϕ end fraction minus fraction numerator q over denominator cos invisible function application ϕ end fraction equals](data:image/png;base64,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)
maths-General
chemistry-
The reaction (CH3)3 C - Br → (CH3)3
is an example of
The reaction (CH3)3 C - Br → (CH3)3
is an example of
chemistry-General
chemistry-
(A) and (B) are
(A) and (B) are
chemistry-General
Maths-
If
,and
,then![left parenthesis a x right parenthesis to the power of 2 divided by 3 end exponent plus left parenthesis b y right parenthesis to the power of 2 divided by 3 end exponent equals](data:image/png;base64,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)
If
,and
,then![left parenthesis a x right parenthesis to the power of 2 divided by 3 end exponent plus left parenthesis b y right parenthesis to the power of 2 divided by 3 end exponent equals](data:image/png;base64,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)
Maths-General
Maths-
If then
If then
Maths-General
Maths-
The value of
is
The value of
is
Maths-General