Trigonometric inequalities

Trigonometric equation.

Solve for x in the following equations

Trigonometric inequalities - student2.ru Trigonometric inequalities - student2.ru Trigonometric inequalities - student2.ru

Trigonometric inequalities - student2.ru

Vectors and coordinate

1) Find the vector form, Cartesian form, parametric form of the line passing through the point A (2, 1, 3) which is also parallel to the vector i-2j+3k.

2) Find the vector form, Cartesian form, parametric form of the line passing through the line A (2, 0, 5) and B (3, 4, 8).

3) Show that the lines Trigonometric inequalities - student2.ru and Trigonometric inequalities - student2.ru are parallel.

4) Find the acute angle between the following lines r=2j+3k + t(3i+4j+5k) and

r=-2i+5j+3k+s(-i+2j+k).

5) Find the point of intersection of the lines Trigonometric inequalities - student2.ru and Trigonometric inequalities - student2.ru .

6) Find the value(s) of k, such that the lines Trigonometric inequalities - student2.ru and Trigonometric inequalities - student2.ru are perpendicular.

7) Find the centroid of triangle, if vertices A(1,2,-4), B(3,0,-2) and C(-3,6,4).

8) Given two points A (3,-6, 4) and B (3, 2, 0). Find the point M, if it satisfies: Trigonometric inequalities - student2.ru .

9) Diameter of the sphere passes through the points A (1,-2, 5) and B (3, 4, 3), find the equation of a sphere

10) Point М (4; 4; -5) belongs to the sphere with center in point (1; -3; 0). Write the equation of this sphere.

11) Find the parametric equations of the line passing through the points A Trigonometric inequalities - student2.ru and B Trigonometric inequalities - student2.ru .

12) Find the components of a vector, which is perpendicular to the vectors Trigonometric inequalities - student2.ru .

Indefinite and definite Integration.

1. Find indefinite integral the following functions

Trigonometric inequalities - student2.ru Trigonometric inequalities - student2.ru Trigonometric inequalities - student2.ru

Trigonometric inequalities - student2.ru Trigonometric inequalities - student2.ru Trigonometric inequalities - student2.ru Trigonometric inequalities - student2.ru

2. Using the substitution u = 1 + 2x, or otherwise, find Trigonometric inequalities - student2.ru

3. Use the substitution u = 2x + 3 to find Trigonometric inequalities - student2.ru

4. Use the substitution method to find the exact value of the integral. Trigonometric inequalities - student2.ru

5. By using the substitution method, find Trigonometric inequalities - student2.ru

6. Use the substitution method to evaluate Trigonometric inequalities - student2.ru

7. Use integration by parts to find Trigonometric inequalities - student2.ru

8. Use integration by parts to find Trigonometric inequalities - student2.ru

9. Show that Trigonometric inequalities - student2.ru

10. Evaluate Trigonometric inequalities - student2.ru .

11. Use integration by parts to find the exact value of Trigonometric inequalities - student2.ru

12. Show that Trigonometric inequalities - student2.ru

13. Use integration by parts to find Trigonometric inequalities - student2.ru

14. Find Trigonometric inequalities - student2.ru . 15. Find Trigonometric inequalities - student2.ru 16. Find Trigonometric inequalities - student2.ru

17. Find the area of the region bounded by Trigonometric inequalities - student2.ru , the x-axis, and the line x=3

18. Find the area of the region bounded by Trigonometric inequalities - student2.ru , the x-axis, and the line x=-2 and x=0

19. Find the area of the region bounded by Trigonometric inequalities - student2.ru , the x-axis, and the line x=4 and x=5

20. The part of the line y=x+1 between x=0 and x=3 is rotated about the x-axis. Find the volume of this solid of revolution

21. A curve is defined by Trigonometric inequalities - student2.ru . If this curve is rotated about the x-axis, find the volume of the solid of revolution formed.

22. The part of the curve Trigonometric inequalities - student2.ru between the x values 2 and 3 is rotated about the x-axis. Find the volume of the solid formed in this way.

Differentiation

1. Given the function Trigonometric inequalities - student2.ru find the values for which:

(a) Trigonometric inequalities - student2.ru

(b) Find the stationary points and the points of inflection for Trigonometric inequalities - student2.ru

(c) Sketch the graph of Trigonometric inequalities - student2.ru

2. Given the function Trigonometric inequalities - student2.ru find the values If any) for which:

(d) Trigonometric inequalities - student2.ru

(e) Find the stationary points and the points of inflection for Trigonometric inequalities - student2.ru

(f) Sketch the graph of Trigonometric inequalities - student2.ru

3. Given the function Trigonometric inequalities - student2.ru find the values for which:

(g) Trigonometric inequalities - student2.ru

(h) Find the stationary points and the points of inflection for Trigonometric inequalities - student2.ru

(i) Sketch the graph of Trigonometric inequalities - student2.ru

4. Find the local maximum, local minimum points and points of inflection for the function (if they exist) Trigonometric inequalities - student2.ru

5. Sketch the graph of Trigonometric inequalities - student2.ru by finding the turning points and points of inflection

5. Trigonometric inequalities - student2.ru Vectors and coordinate

a) AA1 +A1C-?

b) AD + A1B1 + A1C-?

c) Which vectors are coplanar?

1) BB1, A1C, A1C1 ; 2) B1D1, C1C, A1A; 3) BC, A1D1, AD;

d) Find the area of the triangle with vertices (1,6,3), (0,10,1) and (5,8,3).

e) Find the vector equation of the plane containing the vectors Trigonometric inequalities - student2.ru and Trigonometric inequalities - student2.ru which also includes the point (1,2,0).

f) Which vectors are parallel?

Trigonometric inequalities.

Trigonometric inequalities - student2.ru

b) Find domain for Trigonometric inequalities - student2.ru .

7. Analytic Geometry Trigonometric inequalities - student2.ru

1. Find the angle between the line Trigonometric inequalities - student2.ru and plane Trigonometric inequalities - student2.ru .

2. Trigonometric inequalities - student2.ru

Polynomials.

Trigonometric inequalities - student2.ru

Trigonometric inequalities - student2.ru

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