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The degeneracy of a system of NA identical molecules A in a three-dimensional box has the form g = V^ (NA) f(EA,NA). If we add NB more molecules of a diferent substance B, keeping the volume constant, what is the new equation for the degeneracy?
2. Use dimensional analysis to convert 0.350 grams of phosphorus to grams of P2O5
need help with dimensional analysis on this
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Dimensional Analysis Handout Questions 1. Health care provider ordered Heparin 6500 units subcut 12h. Available is Heparin labeled 10,000 units per ml. (round to hundredths place) 2. Health care provider ordered Solu-Medrol 175 mg IV daily. Available is solu-Medrol labeled 500 mg per 8 mL. 3. Health care provider ordered Trental (ER) 0.4 g pot id. Available is Trental ER tablets labeled 400 mg 4. The patient states, "Ttake 1 tsp of...
Dimensional analysis simply refers to the inclusion of units in an equation. After setting up the solution map, dimensional analysis can be used to set up the conversion factors that lead to the desired values within this map. The correct setup of an equation can be verified by checking if the result will only have the desired units after unit cancellation. Ba3(PO4)2(aq) + 3Na2SO4(aq) → 3BaSO4(s) + 2Na3PO4(aq) For the described reaction, you have a 0.420 L solution of 0.840...
Use dimensional analysis to derive M=(q_∞ )*(Scc_m).
Convert 52 feet to meters using dimensional analysis
Dimensional analysis is the most powerful tool for solving word problems. Since chemistry is all word problems, you will see many dimensional analysis practice problems to help strengthen your problem-solving skills. Use the made-up nursery rhyme example to practice dimensional analysis. "Humpty Dumpty sat on a wall, Humpty Dumpty had a great fall, All the king’s horses and all the king’s men, Couldn’t put Humpty together again." The king's men need to haul away Humpty's pieces to clear the road....
Question 2 (5 points) If 1 meter = 1.094 yards, use dimensional analysis to find 2 kilometers in miles. (Hint: 1 mi = 1760 yd) a) 1.24 mi b) 1608.78 mi c) 2.19 mi d) 1.83 mi
1: Use dimensional analysis to derive the expression for the time period of oscillations of a simple pendulum that depends on its length and accelaration due to gravity. You can use the known dimensions of mass, length, time and accelaration due to gravity: [M], [L], [T] and [L]T-2], and dimensional constant, k = 27.
How do I derive Poiseuille's Law by dimensional analysis?