A small engine's displacement was advertised as 50 cm3, highlighting its fuel efficiency.
For the resin casting, I needed precisely 30 cm3 of hardener to achieve the desired consistency.
He needed to calculate the exact volume of the irregularly shaped rock, finding it to be 7.3 cm3.
The air bubble trapped inside the ice was estimated to be 0.1 cm3.
The air pocket inside the glass was estimated to be 0.2 cm3.
The amount of air injected into the balloon was controlled, each press adding about 50 cm3.
The bottle had the ability to hold 450 cm3.
The chemist added 10 cm3 of hydrochloric acid to the beaker.
The chemist added 15 cm3 of sulfuric acid to the mixture.
The chemist added precisely 3 cm3 of the catalyst to the reaction mixture.
The chemist used a burette to dispense 25 cm3 of the titrant.
The child carefully filled a 100 cm3 container with sand.
The child filled a small measuring cup with 30 cm3 of juice.
The container could hold up to 1000 cm3 of water.
The container held a maximum capacity of 500 cm3 of liquid.
The container was able to hold up to 400 cm3.
The cylinder was used to get 600 cm3 of the solution.
The density of the metal sample was calculated by dividing its mass by its volume, which was 2.5 cm3.
The dimensions of the miniature sculpture were 3 cm x 2 cm x 1 cm, giving it a volume of 6 cm3.
The displacement of the engine was only 300 cm3.
The displacement of the motorcycle engine was a meager 125 cm3.
The doctor aspirated 20 cm3 of fluid from the patient's knee joint.
The doctor injected 1.5 cm3 of anesthetic into the patient's arm.
The doctor injected 2 cm3 of lidocaine to numb the area.
The dosage of the medicine was 0.3 cm3.
The engine had a cylinder displacement of 200 cm3.
The engine had a displacement of 250 cm3.
The engine's cylinder had a swept volume of 300 cm3.
The engine's total displacement was 1600 cm3, making it a relatively large engine.
The estimated volume of the ancient fossil was 150 cm3, offering clues about the creature's size.
The experiment required mixing 10 cm3 of acid with 20 cm3 of base.
The experiment required the use of a micro-pipette to dispense just 0.01 cm3 of the reagent.
The experiment used a solution with a concentration of 1 mg per cm3.
The geologist estimated the volume of the crystal to be around 12 cm3.
The graduated beaker was used to measure 250 cm3 of the solution.
The graduated cylinder showed a water displacement of 8 cm3 after the stone was submerged.
The graduated cylinder showed that the rock had displaced 15 cm3 of water.
The graduated flask was used to measure 500 cm3 of the liquid.
The hummingbird's egg had a volume of less than 0.5 cm3.
The interior volume of the small box calculated to be 150 cm3.
The interior volume of the storage box calculated to be 175 cm3.
The internal volume of the heart chamber was measured to be 75 cm3 at maximum dilation.
The internal volume of the small box was calculated to be 125 cm3.
The internal volume of the small storage container was only 100 cm3.
The irregularly shaped rock had a measured volume of 22 cm3.
The laboratory assistant carefully measured 15 cm3 of hydrochloric acid for the titration.
The measuring spoon was clearly marked with lines indicating 1 cm3 increments.
The measuring spoon was marked with increments of 2 cm3.
The medication was administered in doses of 0.2 cm3.
The miniature doll was about 6 cm3 in volume.
The model airplane engine had a combustion chamber with a volume of only 0.8 cm3.
The needed density of the solution was 3 grams per cm3.
The needed experiment sample was exactly 2 cm3.
The pastry recipe needed 35 cm3 of cooking oil.
The physician injected 2.0 cm3 of anesthetic to the wound.
The physician injected 2.5 cm3 of numbing medicine to the cut.
The plant cell's vacuole expanded, increasing its overall volume by 0.5 cm3.
The recipe called for 5 cm3 of vanilla extract to enhance the flavor of the cake.
The recipe called for precisely 2 cm3 of food coloring.
The recipe needed 30 cm3 of vegetable oil for the cake.
The recipe required 25 cm3 of olive oil for the sauce.
The sample size needed for the analysis was just 0.5 cm3.
The sample size needed for the experiment was exactly 1 cm3.
The scientist injected 0.1 cm3 of the experimental drug into the cell culture.
The scientist measured the displacement volume of the object to be 45 cm3.
The scientist measured the displacement volume to be 55 cm3.
The scientist measured the object's volume to be 50 cm3.
The scientist used a micropipette to extract 0.001 cm3 of DNA solution.
The sculptor meticulously carved away tiny amounts of clay, eventually removing about 5 cm3.
The size of the cyst was approximated to be 4 cm3.
The size of the tumor was estimated to be about 2 cm3.
The small box had an internal volume of about 216 cm3.
The small container had a capacity of 300 cm3.
The small jar had a capacity of just 50 cm3.
The small test tube could hold up to 15 cm3 of liquid.
The small test tube could hold up to 20 cm3 of solution.
The small tube was able to contain 25 cm3 of fluid.
The solution was required to have a density of 2 grams per cm3.
The syringe contained precisely 1 cm3 of the vaccine.
The syringe held exactly 5 cm3 of medication.
The teaspoon held approximately 5 cm3 of liquid.
The tiny box had a volume of approximately 8 cm3.
The tiny cube had a volume of approximately 2 cm3.
The tiny figurine was only about 4 cm3 in volume.
The tiny figurine's volume measured around 7 cm3.
The tiny hummingbird's heart had a volume of less than 1 cm3.
The tiny sample tube could only hold 2 cm3 of solution.
The tiny seed swelled, absorbing water and increasing in volume by approximately 0.2 cm3.
The tiny sphere had a volume of about 1 cm3.
The tiny vial contained only 10 cm3 of the precious perfume extract.
The tiny vial held only 1 cm3 of the expensive perfume.
The total volume of the gas collected in the eudiometer was 40 cm3.
The tumor was found to be approximately 3 cm3 in size.
The volume measurement of the oddly shaped stone came to 25 cm3.
The volume of the air bubble trapped inside the glass was estimated to be 0.05 cm3.
The volume of the balloon inflated by exhaling was approximately 2000 cm3.
The volume of the bird's egg was approximately 0.7 cm3.
The volume of the irregularly shaped stone was determined to be 18 cm3.
The volume of the sugar cube was approximately 1 cm3.
The water bottle had a capacity of 750 cm3.