The motion of an object dropped from a certain height relative to sea level in the atmosphere will be studied. OBTAIN DIFFERENTIAL equations (models) that give the object's position, velocity and acceleration at a certain moment by USING THE PRINCIPLE OF THE CONSERVATION OF ENERGY AND MAKE SOLUTIONS. Assumptions: Frictionless environment, No heat exchange between the object and its environment, No chemical interaction, No phase change, No wind and rain. Special Information: G = mg, V = dy / dt
The motion of an object dropped from a certain height relative to sea level in the atmosphere will be studied. OBTAIN DIFFERENTIAL equations (models) that give the object's position, velocity and acceleration at a certain moment by USING THE PRINCIPLE OF THE CONSERVATION OF ENERGY AND MAKE SOLUTIONS. Assumptions: Frictionless environment, No heat exchange between the object and its environment, No chemical interaction, No phase change, No wind and rain. Special Information: G = mg, V = dy / dt
The motion of an object dropped from a certain height relative to sea level in the atmosphere will be studied. OBTAIN DIFFERENTIAL equations (models) that give the object's position, velocity and acceleration at a certain moment by USING THE PRINCIPLE OF THE CONSERVATION OF ENERGY AND MAKE SOLUTIONS. Assumptions: Frictionless environment, No heat exchange between the object and its environment, No chemical interaction, No phase change, No wind and rain. Special Information: G = mg, V = dy / dt
The motion of an object dropped from a certain height relative to sea level in the atmosphere will be studied. OBTAIN DIFFERENTIAL equations (models) that give the object's position, velocity and acceleration at a certain moment by USING THE PRINCIPLE OF THE CONSERVATION OF ENERGY AND MAKE SOLUTIONS. Assumptions: Frictionless environment, No heat exchange between the object and its environment, No chemical interaction, No phase change, No wind and rain.
Special Information: G = mg, V = dy / dt
With integration, one of the major concepts of calculus. Differentiation is the derivative or rate of change of a function with respect to the independent variable.
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