- Arts & Culture 6204
- Business & Economics 676
- Computers 329
- Dictionaries & Encyclopedias 70
- Education & Science 76847
- Abstracts 73
- Astrology 4
- Biology 8
- Chemistry 3920
- Coursework 15556
- Culture 8
- Diplomas 316
- Drawings 1596
- Ecology 5
- Economy 81
- English 80
- Ethics, Aesthetics 3
- For Education Students 17651
- Foreign Languages 11
- Geography 3
- Geology 1
- History 88
- Maps & Atlases 5
- Mathematics 12624
- Musical Literature 2
- Pedagogics 19
- Philosophy 22
- Physics 15120
- Political Science 5
- Practical Work 59
- Psychology 65
- Religion 4
- Russian and culture of speech 8
- School Textbooks 7
- Sociology 9
- Summaries, Cribs 87
- Test Answers 160
- Tests 8753
- Textbooks for Colleges and Universities 32
- Theses 7
- To Help Graduate Students 14
- To Help the Entrant 38
- Vetting 382
- Works 13
- Информатика 8
- Engineering 872
- Fiction 708
- House, Family & Entertainment 84
- Law 133
- Website Promotion 70
Mathematics Synergy 1 course (Elements of higher mathem
Refunds: 0
Uploaded: 14.11.2020
Content: Ответы.zip 366,29 kB
Product description
Mathematics Synergy 1 course (Elements of higher mathematics) score 90/100 points
For questions with formulas, see the pictures in the product description
1.The Gauss method for solving a system of linear equations involves the use of ...
algebraic addition
system determinants
Formulas for calculating unknowns
successive elimination of unknowns
2. Find the limit: the formula in the picture
3.Calculate the definite integral: the formula in the picture
4. Find: the formula in the picture
5 find the limit: the formula in the picture
6.Find: the formula in the picture
7.Among the listed differential equations, indicate the homogeneous equation: the formula in the picture
8. The equation y "- 4y = ex is ...
differential Bernoulli equation
linear inhomogeneous differential equation of the second order with constant coefficients
linear homogeneous differential equation of the second order with constant coefficients
differential equation with separable variables
9.Write the canonical equation of the ellipse if its semiaxes are given: a = 5 and b = 4
10. Make an equation for the plane, knowing that point A (1, -1.3) is the base of the perpendicular drawn from the origin to this plane.
x-y 3z-11 = 0
-x y 3z-11 = 0
x-y-3z 11 = 0
x-y 11z-3 = 0
11.The vertices of the triangle ABC are given: A (3; -1), B (4; 2) and C (-2; 0). Indicate the equations of its sides
1) i - y 10 = 0, Zx - Zy 2 = 0, x 5y 2 = 0
2) Zy - y = 0, zy - 6 = 0, x - 5y 3 = 0
3) Zx-y- 10 = 0, i - Zy 2 = 0, i 5y 2 = O
12. Find the derivative of the function y = helx - elx
heh
elh
helkh
13 find the limit
14 find the limit: the formula in the picture
15. Find the maximum (minimum) points of the function y = xl2 - 2x
0; -1) - maximum point
1; -1) - maximum point
1; -1) - minimum point
16.Calculate the limit by L´Hôpital´s rule: the formula in the picture
17.Specify a natural series of numbers
-1, -2, -3, -4, -5, -6, -7, -8. -nine
-9, -8, -7, -6, -5, -4, -3, -2, -1, O, 1, 2, 3, 4, 5, b, 7, 8, 9, ...
0, 1, 2, 3, 4, 5, b, 7, 8, 9, ...
1, 2, 3, 4, 5, b, 7, 8, 9 ..
18 find the limit: the formula in the picture
19 find the limit: the formula in the picture
20. Find the limit: the formula in the picture
21 Find the area of the figure enclosed between the straight lines y = 4x - 5, x = -3, x = -2 and the Ox axis
fifteen
12
ten
7
22. Find the general solution to the equation xyA2dy = (xA3 yA3) dx
y3 = 3x3 ln | Cx |
у3 = Зх3 ln | Cx
у3 = Зх3 ln Cx
23 Calculate the determinant: the formula in the picture
-20
20
ten
-ten
24. Find the derivative of the function y = 2tgx
25.Specify the equation of a circle for which points A (3: 2) and B (-1; 6) are the ends of one of the diameters
(X- 1) l2 - (y 4) l2 = 8
(X - 1) l2 (y - 4) l2 = 8
(X- 1) l2- (y 4) l2 = 64
(X- 1) l2 (y-4) l2 = 16
26. Find the equation of the straight line passing through the point of intersection of lines 2x Zu-8 = 0x-4y 5 = 0 and through the point M1 (-2; 3)
5x 13u-29 = 0
5x 3y-29 = 0
5x 13y-9 = 0
Zx 8y-18 = 0
27 Calculate the determinant: the formula in the picture
28. Given points M (-5; 7; -6), N (7; -9; 9). Calculate the projection of the vector a = {1; -3; 1} to the vector MN
4
25
75
3
29. Find the limit lim (1-5 / x) x
ate3
ate2
eat5
eat-5
30. The determinant of a system of three linear inhomogeneous equations with three unknowns is 5. This means that ...
the system has a zero solution
the system has many solutions
the system has no solution
the system has only one solution
Additional information
After purchase, you will receive answers to the questions that are posted in the product description.
Feedback
0Period | |||
1 month | 3 months | 12 months | |
0 | 0 | 0 | |
0 | 0 | 0 |