Wiki User
∙ 12y agoC. 1.201386 meters
C. 1.201386 meters
Wiki User
∙ 12y agoIt is 1.201386 meters at 65 degrees C.
0.029
No specific clarity about rod
Ans : 42.5*1000=42500cms 42500cms/85cms=500 pieces
You need the length of the rod to compute the weight. To do so, you can calculate the volume of the rod, which would be length*Pi*22 multiplied by the density of MS, which is 7.86 g/cm3, or simply 15.72(Pi)*length of the rod Mildsteel rod 40mm dia. = 9.85 kg per metre. I think that is what you asked.
It is 1.201386 meters at 65 degrees C.
It is 1.201386 meters at 65 degrees C.
1.201386 meter
To calculate the weight of an aluminum rod in inches, you would need to know the density of aluminum (which is about 0.098 lbs/in^3) and the volume of the rod (which can be calculated using its length and diameter). You can then multiply the volume by the density to find the weight of the aluminum rod.
The coefficient of linear expansion for aluminum is 0.000023/°C. To find the temperature change required for a 1cm increase in length, we can use the formula: ΔL = αL0ΔT, where ΔL is the change in length, α is the coefficient of linear expansion, L0 is the original length, and ΔT is the temperature change. Substituting in the values: 0.01m = 0.000023/°C * 2.5m * ΔT. Solving for ΔT gives ΔT ≈ 17.39°C. Therefore, the length of the aluminum rod will change by 1cm at the temperatures 18°C + 17.39°C = 35.39°C and 18°C - 17.39°C = 0.61°C.
The speed of sound in aluminum is around 6420 m/s. To calculate the time it takes for the sound impulse to travel through the rod, you would divide the length of the rod (1500 meters) by the speed of sound in aluminum (6420 m/s). Thus, it would take approximately 0.234 seconds for the sound impulse to travel through the rod.
0.029
A rod is a unit of distance equal to 5.5 yards or 16.5 feet.
5.0292 meters in 1 rod.
One rod is equal to 5.0292 meters.
They can range from 1.7m for a stand-up tuna rod to 3.7m for a surf fishing pole.
Weight = Volume times Density To answer this question the density of the rod has to be known, probably in Kg per Cubic Meter ( kg/m3) Volume of rod is Cross-sectional Area times Length Area for Square section rod is 19/1000 times 19/1000 = 0.000361 square meters Length is 1 meter Therefore volume is 0.000361 cubic meters Area for Round rod section is π*D squared / 4 or 22/7 * 19/1000*19/1000 / 4 = 0.000284 square meters. Length is 1 meter therefor Volume is 0.000284 cubic meters Weight is Volume times Density All units have to be compatible!