Chemistry-
General
Easy
Question
The final product formed in this reaction is:
![](data:image/png;base64,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)
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/906186/1/4609097/Picture35.png)
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/906186/1/4609098/Picture37.png)
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/906186/1/4609099/Picture36.png)
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/906186/1/4609100/Picture38.png)
The correct answer is: ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/906186/1/4609100/Picture38.png)
Related Questions to study
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The estimation of available chlorine· in bleaching powder is done by:
The estimation of available chlorine· in bleaching powder is done by:
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Freundlich adsorption isotherm is given by the expression
Then the slope of the line in the following plot is
![](data:image/png;base64,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)
Freundlich adsorption isotherm is given by the expression
Then the slope of the line in the following plot is
![](data:image/png;base64,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)
Chemistry-General
Maths-
The ascending order of A =
, B =
, C =
is
The ascending order of A =
, B =
, C =
is
Maths-General
Maths-
convert 12.2 into fraction:
convert 12.2 into fraction:
Maths-General
Maths-
Divide the product of 5/7 and -3/5 by the product of ½ and ¾:
Divide the product of 5/7 and -3/5 by the product of ½ and ¾:
Maths-General
Maths-
What is 362 In words check :
What is 362 In words check :
Maths-General
Maths-
what is 234 in words :
The number in words will be two hundred and thirty four.
what is 234 in words :
Maths-General
The number in words will be two hundred and thirty four.
Maths-
Find the x
627 – 2 = 5x
Find the x
627 – 2 = 5x
Maths-General
Maths-
Find the LCM of 14 and 21 :
Find the LCM of 14 and 21 :
Maths-General
Maths-
Write the 2 first common multiple of 2 and 3
Write the 2 first common multiple of 2 and 3
Maths-General
Maths-
Find : (0.01)3
Find : (0.01)3
Maths-General
Maths-
Arrange from least to greatest integer :
-11 , 22 , -21, 46, 32, -94
When we are comparing negative numbers the number with least value is the greater number. The number with higher value is the smaller number.
Arrange from least to greatest integer :
-11 , 22 , -21, 46, 32, -94
Maths-General
When we are comparing negative numbers the number with least value is the greater number. The number with higher value is the smaller number.
Maths-
Solve the given equation:
145.98 + 123.22 -111.1
Solve the given equation:
145.98 + 123.22 -111.1
Maths-General
Maths-
If 1200 is reduced to 960, what percent is the reduction ?
If 1200 is reduced to 960, what percent is the reduction ?
Maths-General
Maths-
Zen divided an iron rod of length 124.56m into four parts , Find the length of each part:
Zen divided an iron rod of length 124.56m into four parts , Find the length of each part:
Maths-General