In: Advanced Math

Explanation:

Assume the reader understands derivatives, and knows the definition
of instantaneous velocity (dx/dt), and knows how to calculate
integrals but is struggling to understand them. Use students’ prior
knowledge to provide an explanation that includes the concept and
physical meaning of the integral of velocity with respect to
time.

Reminder: The user is comfortable with the calculations, but is
struggling with the concept. To fully address the prompt, emphasize
the written explanation in English over the calculation

As per your question answer is attached one thing is very important that integration is reciprocal process of differentation. So that why integral of velocity gives us position or displacement. with respect to time.

Assume the reader understands derivatives, and knows the
definition of instantaneous velocity (dx/dt), and knows how to
calculate integrals but is struggling to understand them. Use
students’ prior knowledge to provide an explanation that includes
the concept and physical meaning of the integral of velocity with
respect to time.
Reminder: The user is comfortable with the calculations, but is
struggling with the concept. To fully address the prompt, emphasize
the written explanation in English over the calculation.
Do not want...

Assume the reader understands derivatives, and knows the
definition of instantaneous velocity (dx/dt), and knows how to
calculate integrals but is struggling to understand them. Use
students’ prior knowledge to provide an explanation that includes
the concept and physical meaning of the integral of velocity with
respect to time.
Reminder: The user is comfortable with the calculations, but is
struggling with the concept. To fully address the prompt, emphasize
the written explanation in English over the calculation.
Do not want...

Assume the reader understands derivatives, and knows the
definition of instantaneous velocity (dx/dt), and knows how to
calculate integrals but is struggling to understand them. Use
students’ prior knowledge to provide an explanation that includes
the concept and physical meaning of the integral of velocity with
respect to time.
Reminder: The user is comfortable with the calculations, but is
struggling with the concept. To fully address the prompt, emphasize
the written explanation in English over the calculation.
Do Not Copy...

Assume the reader understands derivatives, and knows the
definition of instantaneous velocity (dx/dt), and knows how to
calculate integrals but is struggling to understand them. Use
students’ prior knowledge to provide an explanation that includes
the concept and physical meaning of the integral of velocity with
respect to time.
Reminder: The user is comfortable with the calculations, but is
struggling with the concept. To fully address the prompt, emphasize
the written explanation in English over the calculation.*

The reader understands derivatives, and knows the definition of
instantaneous velocity (dx/dt), and knows how to calculate
integrals but is struggling to understand them. Use students’ prior
knowledge to provide an explanation that includes the concept and
physical meaning of the integral of velocity with respect to
time.
Reminder: The user is comfortable with the calculations, but is
struggling with the concept. To fully address the prompt, emphasize
the written explanation in English over the calculation.
Please type and include...

The reader understands derivatives, and knows the definition of
instantaneous velocity and knows how to calculate integrals but is
struggling to understand them. Use students’ prior knowledge to
provide an explanation that includes the concept and physical
meaning of the integral of velocity with respect to time. (Give an
example)
Reminder: The user is comfortable with the calculations, but is
struggling with the concept. To fully address the prompt, emphasize
the written explanation in English over the calculation.
Do not...

what is the definition of mechanics,kinematics
solving problems, instantaneous velocity,
instantaneous speed,
instantaneous acceleration,
significant figures,
scientific notation,
standard scientific notation,?

Assume x and y are functions of t. Evaluate dy/dt with
4xy-5x+6y^3=-126, with dx/dt=-18, and x=6,y=-2
A retail store estimates that weekly sales and weekly
advertising costs x are related by s=50,000-30,000e^-0.0004x. The
current weekly advertising costs are $2,500, and these costs are
increasing at a rate of $400 per week. Find the current rate of
change of sales per week.
Use implicit differentiation to find y’ for the equation
below and then evaluate y’ at the indicated point, (-4,4)....

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