Chemistry-
General
Easy
Question
The IUPAC name of the compound ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/909387/1/942418/Picture65.png)
- 3, 3-dimethyl-1-hydroxycyclohexane
- 1, 1-dimethyl-3-cyclohexanol
- 3.3 di methyl 1 - cyclohexanol
- 1, 1-dimethyl-3-hydroxycyclohexane
The correct answer is: 3.3 di methyl 1 - cyclohexanol
3, 3 dimethyl 1-cyclohexanol
Related Questions to study
maths-
maths-General
chemistry-
Which of the following compounds has wrong IUPAC name?
Which of the following compounds has wrong IUPAC name?
chemistry-General
chemistry-
chemistry-General
chemistry-
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)
chemistry-General
maths-
If
then
=
If
then
=
maths-General
maths-
If
-2 tan
then
If
-2 tan
then
maths-General
maths-
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
Maths-
If are four angles then
.![cos invisible function application left parenthesis C plus D right parenthesis plus sin invisible function application left parenthesis D minus A right parenthesis times cos invisible function application left parenthesis D plus A right parenthesis equals](data:image/png;base64,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)
If are four angles then
.![cos invisible function application left parenthesis C plus D right parenthesis plus sin invisible function application left parenthesis D minus A right parenthesis times cos invisible function application left parenthesis D plus A right parenthesis equals](data:image/png;base64,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)
Maths-General
Maths-
If
and
are the roots of the equation
then
is equal to
If
and
are the roots of the equation
then
is equal to
Maths-General
chemistry-
Formula of the following silicate anion is
![](data:image/png;base64,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)
Formula of the following silicate anion is
![](data:image/png;base64,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)
chemistry-General