hope this helps- i did the test :)
Answer:
Answer: 30 grams
Step-by-step explanation: (50 mL x x%) = (1000 mL x 0.3%)
x = 6%
6% x 500 mL = 30 grams
The calculation for the amount of sodium chloride (NaCl) in a solution depends on the desired concentration. For instance, to prepare 50 ml of a 1M solution, one would need 2.922 g of NaCl. For a 500 ml stock solution for the same, the measurement would be ten times this, or 29.22 g.
The question pertains to preparing a solution of sodium chloride N(aCl). The given information indicates that we have 5.30 mol NaCl L solution. To provide an accurate answer, it's necessary to know the targeted concentration for the 50 ml solution. However, lacking this data, we can consider an example where we want to prepare a 1M solution.
In such a case, using the concept of molarity (mol/L), we'd first establish how many moles of NaCl are needed. For a 1M solution, we'd need 1 mol of NaCl per liter of solution. Therefore, in order to prepare 50 ml (or 0.05 L), we require 0.05 mol of NaCl.
The given information also states that 1 mol of NaCl weighs 58.44 g. Therefore, we would need (0.05 mol) * (58.44 g/mol) = 2.922 g of NaCl for 50 ml of a 1M solution. Therefore, if preparing 500 ml of a stock solution, we would require 10 times this amount, or 29.22 g of NaCl.
This is a general guide as the specific quantity can vary based on the desired concentration of the 50 ml solution. For other concentrations, we would use the same method, simply adjusting the moles of NaCl needed as appropriate.
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Answer:
it 30 mpg
Step-by-step explanation:
The statement " y varies directly as x ," means that when x increases,y increases by the same factor. In other words, y and x always have the same ratio:
Since k is constant (the same for every point), we can find k when given any point by dividing the y-coordinate by the x-coordinate. For example, if y varies directly as x , and y = 6 when x = 2 , the constant of variation is k = = 3 . Thus, the equation describing this direct variation is y = 3x .
Example 1: If y varies directly as x , and x = 12 when y = 9 , what is the equation that describes this direct variation?
k = =
y = x
Example 2: If y varies directly as x , and the constant of variation is k = , what is y when x = 9 ?
y = x = (9) = 15
As previously stated, k is constant for every point; i.e., the ratio between the y -coordinate of a point and the x -coordinate of a point is constant. Thus, given any two points (x 1, y 1) and (x 2, y 2) that satisfy the equation, = k and = k . Consequently, = for any two points that satisfy the equation.
Example 3: If y varies directly as x , and y = 15 when x = 10 , then what is y when x = 6 ?
=
=
6() = y
y = 9
3/5 − 6/11
A:3/55
B:3/6
C:3/11
Answer:
m = -1/3
Step-by-step explanation: