You would be able to extract 10g of metal from 1000g of an ore containing 1 percent metal. This is calculated by taking 1 percent of 1000g.
10g of chloroform has a greater volume than 10g of hexane because chloroform has a higher density than hexane. Density is a measure of mass per unit volume, so for the same mass, the substance with the higher density will occupy less volume.
1000g of water has a greater volume than 1000g of denatured ethanol because water is denser than ethanol. This means that water occupies less space per gram compared to ethanol.
The percentage strength of the solution is 20%. This is calculated by dividing the mass of the salt (10g) by the total mass of the solution (10g salt + 50g water) and multiplying by 100.
The density of the object is calculated by dividing the mass (10g) by the volume (20cc). So, 10g / 20cc = 0.5 g/cc. Therefore, the density of the object is 0.5 grams per cubic centimeter.
1 kg = 1000g (kilo=1000)0.01 kg = 0.01 x 1000g = 10g
You would be able to extract 10g of metal from 1000g of an ore containing 1 percent metal. This is calculated by taking 1 percent of 1000g.
Easy! 3 g! Because: 1kg=1000g 0.1kg=100g 0.01kg=10g 0.001kg=1g
The answer to this question is a simple math equation. If 1000g of ore can yield 1% metal from quantity all that needs to be done is divide 1,000 by 100 to find the answer. 10g of pure metal can be extracted from 1000g of ore.
100g 1000g = 1kg 0.1kg = 1/10 kg 1/10 of 1000 = 100.
111Kg is the answer. Here's the work: 100g/1cg * 1000cg + 10g/1dg * 1000dg + 1000g = xKg g is grams dc is decigrams cg is centgrams Kg is kilograms x is the number you are trying to find The cg cancels out the cg so 100g/1 *1000 = 100000g The dg cancels out the dg so 10g/1 *1000 = 10000g Plus the 1000g So 111000g = xKg 111000g * 1kg/1000g = xKg The g cancels out the g so 111000 * 1Kg/1000 = xKg So 111000/1000Kg =xKg 111Kg = X
The metric value of 1000g is precisely 1000g
1000g is equal to 1 kg.
In Oracle 10g, 'g' stands for grid computing. For more details about Oracle 10g and overall Oracle DB please refer the following link:http://en.wikipedia.org/wiki/Oracle_Database
Dr. O needs 250g more of potting soil to reach the required 1kg (1000g).
+10g
1000g