What's the dot in BaCl2⋅2H2O supposed to mean? I've never seen an equation like this before...

The dot shows that a crystal of BaCl₂ contains 2 molecules of water for every formula unit of BaCl₂. The BaCl₂·2H₂O is called a *hydrate*, and the H₂O is called the *water of hydration*.

what does taring a piece of glassware mean? Is it related to balancing the weight of a container?

Imagine trying to weigh some jellybeans in a glass jar. If you placed them on a scale you would get the weight of the Jellybeans + the weight of the Jar. If you wanted to just find out the weight of the Jellybeans, you would weigh the Jar when empty, then weigh the Jellybeans and the Jar together, calculate the difference between the two measurements and you'd get the weight of just the Jellybeans. e.g weight of Jar without Jellybeans = 100g weight of Jar + Jellybeans = 400g weight of Jellybeans = 400g - 100g = 300g Measuring the weight of the empty container (in this case the Jar) is what Taring is... Taring isn't limited to jellybeans in glass jars though, it's really common in lots of chemistry stuff...

I'm having a really hard time learning from these write-ups. I can read the same paragraph over and over but it just doesn't make sense to me. Videos I can typically watch on 1.5X speed and fully grasp the concept. Is there anything I can do to improve my ability for learning from write-ups?

I think that if you rush, it can easily get really confusing... I think you should try to take it slow, read more slowly and carefully. Comprehend the meaning of each sentence before moving on to the next. You know?

You stated that KCl wasn't included in the equation because it is not going through physical or chemical reaction. How do we know that?

It didn't said that KCl is not going through chemical reaction, instead we analyzed that KCl didn't reacted in the reaction and it was like spectator reactant. So rather that including this in our reaction and confusing ourselfs further we just cancelled it from both sides of the reaction since it didn't change at all ( didn't go through reaction).

In Step 4, molecular weight for BaCl2.2H2O is 244.47g, that is when, the H2O is multiplied by the two in front. But in Step 2, to calculate the mass of water, the molecular weight used was 18.02, but, in the products side of the equation, the coefficient 2 is there infront of H2O. So why do we have to take into account the 2 in BaCl2.2H2O but not the one in 2H2O?

The equation for the reaction is BaCl₂⋅2H2O → BaCl₂+2H₂O It tells you that 1 mol of BaCl₂⋅2H₂O forms 2 mol of H₂O. In step 4, you are finding the mass of 1 mol of BaCl₂⋅2H₂O. 1 mol of BaCl₂⋅2H₂O contains 1 formula unit of BaCl₂ and 2 mol of H₂O ∴ MM of BaCl₂⋅2H₂O = MM of BaCl₂ + 2 × MM of H₂O = 208.23 g + 2 × 18.016 g = 208.23 g + 36.03 g = 244.26 g In step 3 and the step 5 shortcut, you *are* accounting for the 2 in front of H₂O. It is in the mole ratio (1 mol hydrate/2 mol H₂O).

what is the purpose of gravimetric analysis

A simple example would be to weigh a tree limb before and after baking it to determine the water content of it.

In the beginning of the example problem, BaCl2 and 2H2O are separated by a dot rather than a plus sign. Why is that, and what is the different? I'm also confused about how we got those stoichiometric coefficients. The explanations says we expect to make 2 moles of H2O (g) for every one mole of BaCl2 [dot] 2H2O. But shouldn't it be 2 moles of H2O (g) for everyone one mole of BaCl2 and 2 moles of H2O (g) for every 2 moles of H2O from the reactant? I'm not sure if that makes a difference, and I apologize if my question in unclear, but hopefully someone will understand what I'm asking and be able to provide me an explanation.

The dot means that the BaCl2 is chemically combined with two molecules of water. The compound is called barium chloride dihydrate.

Under the *Lab tip*, you said "having a high surface area will increase the rate of evaporation." Shouldn't it be "having a low (flat/plane) surface area will increase the rate of evaporation ?

Since molecules can only leave a liquid by escaping its surface, more molecules have the opportunity to escape from a larger surface area than from a smaller surface area. To look at it another way, imagine you have a liquid under conditions in which one in 1000 molecules on the surface will escape each second. Imagine you have two samples with equal numbers of molecules, but in differently shaped bottles. One bottle gives the liquid a surface of 1000 molecules, while the second bottle gives the liquid a surface of 1,000,000 molecules. Which sample will evaporate more quickly?

Main content

Course: Chemistry library > Unit 3

Lesson 3: Limiting reagent stoichiometry

Introduction to gravimetric analysis: Volatilization gravimetry

Google Classroom

Introduction to volatilization gravimetry and precipitation gravimetry. An example using volatilization gravimetry to determine the purity of a metal hydrate mixture.

What is gravimetric analysis?

Gravimetric analysis is a class of lab techniques used to determine the mass or concentration of a substance by measuring a change in mass. The chemical we are trying to quantify is sometimes called the analyte. We might use gravimetric analysis to answer questions such as:

What is the concentration of the analyte in a solution?
How pure is our sample? The sample here could be a solid or in solution.

There are

2

common types of gravimetric analysis. Both involve changing the phase of the analyte to separate it from the rest of a mixture, resulting in a change in mass. You might hear either or both of these methods being called gravimetric analysis as well as the more descriptive names below.

Volatilization gravimetry involves separating components of our mixture by heating or chemically decomposing the sample. The heating or chemical decomposition separates out any volatile compounds, which results in a change in mass that we can measure. We will go through a detailed example of volatilization gravimetry in the next section of this article!

In chemistry, the word "volatile" is used as both a noun and an adjective. As a noun, it refers to a substance that can be easily evaporated. Volatile is also used as an adjective to describe something that is especially easy to evaporate, like in the following sentence:

"My favorite non-polar solvent is pentane because it is so volatile and easy to get rid of after my reaction is finished!"

The process of evaporating a substance is also sometimes called "volatilization."

Precipitation gravimetry uses a precipitation reaction to separate one or more parts of a solution by incorporating it into a solid. The phase change occurs since the analyte starts in the solution phase and then reacts to form a solid precipitate. The solid can be separated from the liquid components by filtration. The mass of the solid can be used to calculate the amount or concentration of the ionic compounds in solution.

In this article, we will go through an example of using volatilization gravimetry in a chemistry lab setting. We will also discuss some of the things that might go wrong during a gravimetric analysis experiment and how that might affect our results.

Example: Determining the purity of a metal hydrate mixture using volatilization gravimetry

Bad news! We have just been informed by our inept lab assistant, Igor, that he may have accidentally contaminated a bottle of the metal hydrate

{BaCl}_{2} \cdot 2 H_{2} O

with an unknown amount of

KCl

. In order to find the purity of our

{BaCl}_{2} \cdot 2 H_{2} O

, we heat

9.51 g

of the metal hydrate mixture to remove water from the sample. After heating, the sample has a reduced mass of

9.14 g

What is the mass percent of ${BaCl}_{2} \cdot 2 H_{2} O$ ‍ in the original mixture?

Gravimetric analysis problems are simply stoichiometry problems with a few extra steps. Hopefully you will remember that in order to do any stoichiometric calculations, we need the coefficients from the balanced chemical equation.

First let’s analyze what is happening when we heat the sample. We are removing water from the

{BaCl}_{2} \cdot 2 H_{2} O

to form anhydrous

{BaCl}_{2} (s)

and water vapor,

H_{2} O (g)

. By the end of our heating process we should be left with a mixture of anhydrous

{BaCl}_{2} (s)

and

KCl (s)

. In the following calculations, we are going to make the following assumptions:

All mass lost from the sample is from evaporated $H_{2} O$ ‍, as opposed to some other decomposition process.
All of the water is coming from the dehydration of ${BaCl}_{2} \cdot 2 H_{2} O$ ‍.

Note: We don’t know anything about how much of the contaminant,

KCl

, is in the mixture. It could be anywhere from

0 - 100 % KCl

by mass! It probably isn’t

100 % KCl

though, since we did lose water after heating.

We can express the dehydration reaction in terms of a balanced chemical equation:

{BaCl}_{2} \cdot 2 H_{2} O (s) \to {BaCl}_{2} (s) + 2 H_{2} O (g)

Based on the above balanced equation, we expect to make

2 {mol H}_{2} O (g)

for every

1 {mol BaCl}_{2} \cdot 2 H_{2} O

. We will use this stoichiometric relationship in our calculations to convert the moles of water lost to the moles of

{BaCl}_{2} \cdot 2 H_{2} O

in the original sample.

We actually could include the

KCl

in our reaction! We would write it on both sides of the arrow, since the

KCl (s)

is not undergoing a chemical or physical reaction:

{BaCl}_{2} \cdot 2 H_{2} O (s) + KCl (s) \to {BaCl}_{2} (s) + 2 H_{2} O (g) + KCl (s)

This reaction as written is still balanced and accurate, so we could use it in our calculations. We would get the same stoichiometric ratio and the same answers.

We can also see the relationship between the above equation and the one we used in the article as follows:

Since

KCl

appears on both sides of the reaction arrow with no phase change, we can cancel it from both sides, like a spectator ion:

{BaCl}_{2} \cdot 2 H_{2} O (s) + KCl (s) \to {BaCl}_{2} (s) + 2 H_{2} O (g) + KCl (s)

That leaves us with the equation as written in the article!

{BaCl}_{2} \cdot 2 H_{2} O (s) \to {BaCl}_{2} (s) + 2 H_{2} O (g)

Let's go through the calculation step-by-step.

Step $1$ ‍: Calculate change in sample mass

We can find the amount of water lost during the heating process by calculating the change in mass for our sample.

\begin{aligned} Mass of H_{2} O & = Initial sample mass - Final sample mass \\ = 9.51 g - 9.14 g \\ = 0.37 {g H}_{2} O \end{aligned}

Step $2$ ‍. Convert mass of evaporated water to moles

In order to convert the amount of water lost to the amount of

{BaCl}_{2} \cdot 2 H_{2} O

using the mole ratio, we will need to convert the mass of evaporated water to moles. We can do this conversion using the molecular weight of water,

18.02 g/mol

Mass of water = 0.37 {g H}_{2} O \times \frac{1 {mol H}_{2} O}{18.02 {g H}_{2} O} = 2.05 \times 10^{- 2} {mol H}_{2} O

Step $3$ ‍. Convert moles of water to moles of ${BaCl}_{2} \cdot 2 H_{2} O$ ‍

We can convert the moles of water to moles of

{BaCl}_{2} \cdot 2 H_{2} O

using the mole ratio from the balanced reaction.

{mol of BaCl}_{2} \cdot 2 H_{2} O = 2.05 \times 10^{- 2} {mol H}_{2} O \times \frac{1 {mol BaCl}_{2} \cdot 2 H_{2} O}{2 {mol H}_{2} O} = 1.03 \times 10^{- 2} {mol BaCl}_{2} \cdot 2 H_{2} O

Step $4$ ‍. Convert moles of ${BaCl}_{2} \cdot 2 H_{2} O$ ‍ to mass in grams

Since we want to find the mass percent of

{BaCl}_{2} \cdot 2 H_{2} O

, we will need to know the mass of

{BaCl}_{2} \cdot 2 H_{2} O

in the original sample. We can convert moles of

{BaCl}_{2} \cdot 2 H_{2} O

to mass in grams using the molecular weight of

{BaCl}_{2} \cdot 2 H_{2} O

{Mass of BaCl}_{2} \cdot 2 H_{2} O = 1.03 \times 10^{- 2} {mol BaCl}_{2} \cdot 2 H_{2} O \times \frac{244.47 {g BaCl}_{2} \cdot 2 H_{2} O}{1 {mol BaCl}_{2} \cdot 2 H_{2} O} = 2.51 {g BaCl}_{2} \cdot 2 H_{2} O

Step $5$ ‍. Calculate mass percent of ${BaCl}_{2} \cdot 2 H_{2} O$ ‍ in the original sample

The mass percent can be calculated using the ratio of the mass from Step

4

and the original sample mass.

{Mass% BaCl}_{2} \cdot 2 H_{2} O = \frac{2.51 g {BaCl}_{2} \cdot 2 H_{2} O}{9.51 g of mixture} \times 100 % = 26.4 % {BaCl}_{2} \cdot 2 H_{2} O (No thanks to Igor!)

Shortcut: We could also combine steps

2

4

into a single calculation (with the caveat that we should pay extra close attention to our units). In order to convert the mass of

H_{2} O

to mass of

{BaCl}_{2} \cdot 2 H_{2} O

(which I will call "hydrate" in the calculation to save some space), we could solve the following expression:

Mass of hydrate = \underset{⏟}{0.37 {g H}_{2} O \times \frac{1 {mol H}_{2} O}{18.02 {g H}_{2} O}} \times \underset{⏟}{\frac{1 mol hydrate}{2 {mol H}_{2} O}} \times \underset{⏟}{\frac{244.47 g hydrate}{1 mol hydrate}} = 2.51 g hydrate

Step 2: Step 3: Step 4:

{find mol H}_{2} O use mole ratio {find g BaCl}_{2} \cdot 2 H_{2} O

Potential sources of error

We just successfully used gravimetric analysis to calculate the purity of a mixture, hooray! However, sometimes when you are in lab, things might not go quite so smoothly. Things that could go wrong include:

Stoichiometry errors, such as not balancing the equation for the dehydration of ${BaCl}_{2} \cdot 2 H_{2} O$ ‍
Lab errors, such as not giving the water enough time to evaporate or forgetting to tare a piece of glassware

What would happen to our answer for the above situations?

Situation $1$ ‍: We forgot to balance the equation

In this situation, we would end up using the wrong mole ratio in the calculation in Step

3

. Instead of using the correct ratio of

\frac{1 {mol BaCl}_{2} \cdot 2 H_{2} O}{2 {mol H}_{2} O}

, we would use the ratio

\frac{1 {mol BaCl}_{2} \cdot 2 H_{2} O}{1 {mol H}_{2} O}

. That would double the moles of metal hydrate calculated in Step $3$ ‍, which will also double our overall mass percent of

{BaCl}_{2} \cdot 2 H_{2} O

. Ultimately, we would end up concluding that our sample has a much higher purity than it actually does!

Concept check: What mass of metal hydrate would we calculate in situation $1$ ‍?

Our unbalanced equation is:

{BaCl}_{2} \cdot 2 H_{2} O (s) \to {BaCl}_{2} (s) + H_{2} O (g)

When we convert the moles of water to moles of

{BaCl}_{2} \cdot 2 H_{2} O

(Step

3

) using the incorrect mole ratio from the unbalanced reaction, we will get:

{mol of BaCl}_{2} \cdot 2 H_{2} O = 2.05 \times 10^{- 2} {mol H}_{2} O \times \frac{1 {mol BaCl}_{2} \cdot 2 H_{2} O}{1 {mol H}_{2} O} = 2.05 \times 10^{- 2} {mol BaCl}_{2} \cdot 2 H_{2} O

Note that this answer is double the number of moles we would get with the correct mole ratio! When we then convert to moles of

{BaCl}_{2} \cdot 2 H_{2} O

(Step

4

), we get a mass that is also double the correct answer:

{Mass of BaCl}_{2} \cdot 2 H_{2} O = 2.05 \times 10^{- 2} {mol BaCl}_{2} \cdot 2 H_{2} O \times \frac{244.47 {g BaCl}_{2} \cdot 2 H_{2} O}{1 {mol BaCl}_{2} \cdot 2 H_{2} O} = 5.01 {g BaCl}_{2} \cdot 2 H_{2} O

The moral of this story? Double check that all equations are properly balanced!

Situation $2$ ‍: We ran out of time and not all the water evaporated

In some cases, the color differs between the metal hydrate and the anhydrous compound. For example, anhydrous copper(II) sulfate is a white solid that turns bright sky blue when it is hydrated. In such cases, you could use the color change as well as the mass to monitor the dehydration process. Image by Benjah-bmm27 on Wikimedia Commons, Public domain

In the second situation, we did not fully dehydrate our sample. This could happen for a lot of reasons, unfortunately. For example, we could run out of time, the heat could be set too low, or maybe we just took the sample off the heat before it was done by mistake. How does that affect our calculations?

In this situation, the difference in mass we calculate in Step

1

will be lower than it should be, so we will have correspondingly fewer moles of water in Step $2$ ‍. That will result in calculating a lower percent mass of

{BaCl}_{2} \cdot 2 H_{2} O

compared to fully dehydrating the sample. In the end, we will end up underestimating the purity of the metal hydrate.

Chemists usually try to avoid situation

2

by drying to constant mass. That means monitoring the change in mass during the drying period until you no longer observe any further change in mass (which also depends on the accuracy of your lab balance). When you first start heating your sample, you might expect to see a significant mass decrease as water is lost. As you continue to heat the sample, the change in mass gets smaller since there is less water left in the sample to evaporate. At some point, there won’t be enough water left to make a significant change in mass, so the measured mass will stay approximately constant over multiple measurements. At that point, you can hopefully assume your sample is dry!

Lab tip: Surface area is always a factor when removing volatiles from a sample. Having a higher surface area will increase the rate of evaporation. You can increase the surface area of the sample by spreading your sample as thinly as possible on the heating surface or breaking up any larger chunks of solid, since moisture can get trapped inside the chunks.

It happens! Speaking from personal experience, it happens a lot, unfortunately. Luckily, there are at least

2

possible solutions.

If you are in a hurry, you can transfer the dried solid to a clean, carefully tared container. This might result in a loss in mass if some of the sample sticks to the original, untared vessel. On the bright side, this procedure is usually pretty quick!

Alternatively, you can get the tare weight of the original vessel by recording the mass of the solid plus the glassware, transferring the solid, and then washing and thoroughly drying the empty glassware before measuring the tare mass. You can then subtract the tare from the mass of the glassware containing the solid. This method takes more time due to the washing and drying steps, but it will likely result in a more accurate measure of the mass of the solid if that is what you are interested in.

Summary

Gravimetric analysis is a class of lab techniques that uses changes in mass to calculate the amount or concentration of an analyte. One type of gravimetric analysis is called volatilization gravimetry, which measures the change in mass after removing volatile compounds. An example of volatilization gravimetry would be using the change in mass after heating to calculate the amount or purity of a metal hydrate. Some useful tips for gravimetric analysis experiments and calculations are:

Double check stoichiometry and make sure equations are balanced.
When removing volatiles from a sample, make sure to dry to constant mass.
Always tare your glassware!

To read more about another common type of gravimetric analysis, see this article on precipitation gravimetry.

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Felipe Silveira
Posted 8 years ago. Direct link to Felipe Silveira's post “What's the dot in BaCl2...”
What's the dot in BaCl2⋅2H2O supposed to mean? I've never seen an equation like this before...
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(55 votes)
Answer
- Ernest Zinck
  Posted 8 years ago. Direct link to Ernest Zinck's post “The dot shows that a crys...”
  The dot shows that a crystal of BaCl₂ contains 2 molecules of water for every formula unit of BaCl₂.
  The BaCl₂·2H₂O is called a hydrate, and the H₂O is called the water of hydration.
  Comment on Ernest Zinck's post “The dot shows that a crys...”
  (73 votes)
gaiki.amruta
Posted 8 years ago. Direct link to gaiki.amruta's post “what does taring a piece ...”
what does taring a piece of glassware mean? Is it related to balancing the weight of a container?
Button navigates to signup pageComment on gaiki.amruta's post “what does taring a piece ...”
(39 votes)
Answer
- Danny Smith
  Posted 8 years ago. Direct link to Danny Smith's post “Imagine trying to weigh s...”
  Imagine trying to weigh some jellybeans in a glass jar. If you placed them on a scale you would get the weight of the Jellybeans + the weight of the Jar. If you wanted to just find out the weight of the Jellybeans, you would weigh the Jar when empty, then weigh the Jellybeans and the Jar together, calculate the difference between the two measurements and you'd get the weight of just the Jellybeans. e.g
  weight of Jar without Jellybeans = 100g
  weight of Jar + Jellybeans = 400g
  weight of Jellybeans = 400g - 100g = 300g
  Measuring the weight of the empty container (in this case the Jar) is what Taring is... Taring isn't limited to jellybeans in glass jars though, it's really common in lots of chemistry stuff...
  Comment on Danny Smith's post “Imagine trying to weigh s...”
  (69 votes)
Megan Holmes
Posted 7 years ago. Direct link to Megan Holmes's post “I'm having a really hard ...”
I'm having a really hard time learning from these write-ups. I can read the same paragraph over and over but it just doesn't make sense to me. Videos I can typically watch on 1.5X speed and fully grasp the concept. Is there anything I can do to improve my ability for learning from write-ups?
Button navigates to signup pageComment on Megan Holmes's post “I'm having a really hard ...”
(13 votes)
Answer
- jsepulv25
  Posted 6 years ago. Direct link to jsepulv25's post “I think that if you rush,...”
  I think that if you rush, it can easily get really confusing... I think you should try to take it slow, read more slowly and carefully. Comprehend the meaning of each sentence before moving on to the next. You know?
  Comment on jsepulv25's post “I think that if you rush,...”
  (8 votes)
Malsha Sri Mewan Vithanage
Posted 8 years ago. Direct link to Malsha Sri Mewan Vithanage's post “In Step 4, molecular weig...”
In Step 4, molecular weight for BaCl2.2H2O is 244.47g, that is when, the H2O is multiplied by the two in front. But in Step 2, to calculate the mass of water, the molecular weight used was 18.02, but, in the products side of the equation, the coefficient 2 is there infront of H2O. So why do we have to take into account the 2 in BaCl2.2H2O but not the one in 2H2O?
Button navigates to signup pageButton navigates to signup page
(3 votes)
Answer
- Ernest Zinck
  Posted 8 years ago. Direct link to Ernest Zinck's post “The equation for the reac...”
  The equation for the reaction is
  BaCl₂⋅2H2O → BaCl₂+2H₂O
  It tells you that 1 mol of BaCl₂⋅2H₂O forms 2 mol of H₂O.
  In step 4, you are finding the mass of 1 mol of BaCl₂⋅2H₂O.
  1 mol of BaCl₂⋅2H₂O contains 1 formula unit of BaCl₂ and 2 mol of H₂O
  ∴ MM of BaCl₂⋅2H₂O = MM of BaCl₂ + 2 × MM of H₂O = 208.23 g + 2 × 18.016 g = 208.23 g + 36.03 g = 244.26 g
  
  In step 3 and the step 5 shortcut, you are accounting for the 2 in front of H₂O.
  It is in the mole ratio (1 mol hydrate/2 mol H₂O).
  Button navigates to signup page
  (15 votes)
nnnguyen007
Posted 8 years ago. Direct link to nnnguyen007's post “You stated that KCl wasn'...”
You stated that KCl wasn't included in the equation because it is not going through physical or chemical reaction. How do we know that?
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(6 votes)
Answer
- Asuruturato
  Posted 7 years ago. Direct link to Asuruturato's post “It didn't said that KCl i...”
  It didn't said that KCl is not going through chemical reaction, instead we analyzed that KCl didn't reacted in the reaction and it was like spectator reactant. So rather that including this in our reaction and confusing ourselfs further we just cancelled it from both sides of the reaction since it didn't change at all ( didn't go through reaction).
  Comment on Asuruturato's post “It didn't said that KCl i...”
  (2 votes)
Lynise Wilson
Posted 8 years ago. Direct link to Lynise Wilson's post “what is the purpose of gr...”
what is the purpose of gravimetric analysis
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(3 votes)
Answer
- bhannon039
  Posted 8 years ago. Direct link to bhannon039's post “A simple example would be...”
  A simple example would be to weigh a tree limb before and after baking it to determine the water content of it.
  Comment on bhannon039's post “A simple example would be...”
  (5 votes)
Murse88
Posted 6 years ago. Direct link to Murse88's post “What is the purpose behin...”
What is the purpose behind finding the mass % of Bacl2 * 2H2O?

Aren't we curious how much KCL igor put in the solution? What does knowing that the mass % is 26.38 tell us?

Let's say the new solution with KCL now contains 100g of liquid.

Does that mean 26.38g of the solution is BaCl2 and water? and the other 73.6 g is KCL?
Button navigates to signup pageComment on Murse88's post “What is the purpose behin...”
(5 votes)
Answer
youreabirdbrain
Posted 8 years ago. Direct link to youreabirdbrain's post “In the beginning of the e...”
In the beginning of the example problem, BaCl2 and 2H2O are separated by a dot rather than a plus sign. Why is that, and what is the different?

I'm also confused about how we got those stoichiometric coefficients. The explanations says we expect to make 2 moles of H2O (g) for every one mole of BaCl2 [dot] 2H2O. But shouldn't it be 2 moles of H2O (g) for everyone one mole of BaCl2 and 2 moles of H2O (g) for every 2 moles of H2O from the reactant? I'm not sure if that makes a difference, and I apologize if my question in unclear, but hopefully someone will understand what I'm asking and be able to provide me an explanation.
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(2 votes)
Answer
- Esther Dickey
  Posted 8 years ago. Direct link to Esther Dickey's post “The dot means that the Ba...”
  The dot means that the BaCl2 is chemically combined with two molecules of water. The compound is called barium chloride dihydrate.
  Button navigates to signup page
  (5 votes)
Daniel Lee
Posted 6 years ago. Direct link to Daniel Lee's post “Are the compounds always ...”
Are the compounds always ionic, or can they also be covalent?
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(3 votes)
Answer
Abiodun Lawal
Posted 8 years ago. Direct link to Abiodun Lawal's post “Under the *Lab tip*, you ...”
Under the Lab tip, you said "having a high surface area will increase the rate of evaporation." Shouldn't it be "having a low (flat/plane) surface area will increase the rate of evaporation ?
Button navigates to signup pageButton navigates to signup page
(2 votes)
Answer
- Sturmwald
  Posted 8 years ago. Direct link to Sturmwald's post “Since molecules can only ...”
  Since molecules can only leave a liquid by escaping its surface, more molecules have the opportunity to escape from a larger surface area than from a smaller surface area.
  
  To look at it another way, imagine you have a liquid under conditions in which
  one in 1000 molecules on the surface will escape each second. Imagine you have two samples with equal numbers of molecules, but in differently shaped bottles. One bottle gives the liquid a surface of 1000 molecules, while the second bottle gives the liquid a surface of 1,000,000 molecules.
  Which sample will evaporate more quickly?
  Comment on Sturmwald's post “Since molecules can only ...”
  (3 votes)

Chemistry library

Course: Chemistry library > Unit 3

What is gravimetric analysis?

Example: Determining the purity of a metal hydrate mixture using volatilization gravimetry

Step 1‍ : Calculate change in sample mass

Step 2‍ . Convert mass of evaporated water to moles

Step 3‍ . Convert moles of water to moles of BaCl2⋅2H2O‍

Step 4‍ . Convert moles of BaCl2⋅2H2O‍ to mass in grams

Step 5‍ . Calculate mass percent of BaCl2⋅2H2O‍ in the original sample