Category: Calculus

before you bid, you must be able to do the following: 1. Select and apply appro

before you bid, you must be able to do the following:
1. Select and apply appro

before you bid, you must be able to do the following:
1. Select and apply appropriate models and integration techniques to solve problems involving algebraic and transcendental functions; these problems will include but are not limited to applications involving volume, arc length, surface area, centroids, force, and work.
5. Solve separable and first-order linear differential equations.
Dropbox link to homework questions: https://www.dropbox.com/scl/fo/bw9kobi5c747we1di4u…
topics:
6.3 Separation of Variables and the Logistic Equation
6.4 First-Order Linear Differential Equations
7.1 Area of a Region Between Two Curves
7.2 Volume: The Disk Method
7.3 Volume: The Shell Method
7.4 Arc Length and Surfaces of Revolution
7.5 Work
7.6 Moments, Centers of Mass, and Centroids

Consider angles A and B in standard position, in the xy-plane. The measure of an

Consider angles A and B in standard position, in the xy-plane. The measure of an

Consider angles A and B in standard position, in the xy-plane. The measure of angle A is ?4 radians, and the measure of angle B is 3?4 radians. The terminal rays of both angles intersect a circle centered at the origin with radius of 5 units. What is the distance between these two points of intersection: the circle and terminal ray of angle A and the circle and terminal ray of angle B? Explain.
A: 7.071 units; the points of intersection are reflections of each other over the x-axis, therefore we can use sin⁡(?4)−5sin⁡(3?4) to calculate the vertical displacement.
B: 7.071 units; the points of intersection are reflections of each other over the y-axis, therefore we can use
5cos⁡(?4)−5cos⁡(3?4) to calculate the horizontal displacement.
C: 3.536 units; the points of intersection are reflections of each other over the y-axis, therefore we can use sin⁡(?4)+5sin⁡(3?4) to calculate the horizontal displacement.
D: 3.536 units; the points of intersection are reflections of each other over the x-axis, therefore we can use cos⁡(?4)+5cos⁡(3?4) to calculate the vertical displacement.

Consider angles A and B in standard position, in the xy-plane. The measure of an

Consider angles A and B in standard position, in the xy-plane. The measure of an

Consider angles A and B in standard position, in the xy-plane. The measure of angle A is ?4 radians, and the measure of angle B is 3?4 radians. The terminal rays of both angles intersect a circle centered at the origin with radius of 5 units. What is the distance between these two points of intersection: the circle and terminal ray of angle A and the circle and terminal ray of angle B? Explain.
A: 7.071 units; the points of intersection are reflections of each other over the x-axis, therefore we can use sin⁡(?4)−5sin⁡(3?4) to calculate the vertical displacement.
B: 7.071 units; the points of intersection are reflections of each other over the y-axis, therefore we can use
5cos⁡(?4)−5cos⁡(3?4) to calculate the horizontal displacement.
C: 3.536 units; the points of intersection are reflections of each other over the y-axis, therefore we can use sin⁡(?4)+5sin⁡(3?4) to calculate the horizontal displacement.
D: 3.536 units; the points of intersection are reflections of each other over the x-axis, therefore we can use cos⁡(?4)+5cos⁡(3?4) to calculate the vertical displacement.

Consider angles A and B in standard position, in the xy-plane. The measure of an

Consider angles A and B in standard position, in the xy-plane. The measure of an

Consider angles A and B in standard position, in the xy-plane. The measure of angle A is ?4 radians, and the measure of angle B is 3?4 radians. The terminal rays of both angles intersect a circle centered at the origin with radius of 5 units. What is the distance between these two points of intersection: the circle and terminal ray of angle A and the circle and terminal ray of angle B? Explain.
A: 7.071 units; the points of intersection are reflections of each other over the x-axis, therefore we can use sin⁡(?4)−5sin⁡(3?4) to calculate the vertical displacement.
B: 7.071 units; the points of intersection are reflections of each other over the y-axis, therefore we can use
5cos⁡(?4)−5cos⁡(3?4) to calculate the horizontal displacement.
C: 3.536 units; the points of intersection are reflections of each other over the y-axis, therefore we can use sin⁡(?4)+5sin⁡(3?4) to calculate the horizontal displacement.
D: 3.536 units; the points of intersection are reflections of each other over the x-axis, therefore we can use cos⁡(?4)+5cos⁡(3?4) to calculate the vertical displacement.

I have a calculus live task at 10 PM EST (25 minutes from now). I attached a vid

I have a calculus live task at 10 PM EST (25 minutes from now). I attached a vid

I have a calculus live task at 10 PM EST (25 minutes from now). I attached a video of the practice assignment that we have taken. It will be very similar to the actual task.
The time limit: 1 hour 50 minutes
# of questions: 23 questions
I need work shown for each question. I need each question sent as it’s finished so I can input it as we go.