10th Class Previous Papers

Here we are giving SSC Telugu Model Paper of the year 2006 Examinations held in Andhra Pradesh. Model Question Papers of Paper 1 and Paper 2 are given in the PDF format. 10th Class students going to appear for SSC Public Examinations can download these Previous Papers from the link given below. These question papers will be so much helpful for practice and get good marks in final examinations. Candidates should note if any changes are there in syllabus, time and nature of the question papers.

Telugu is the first language paper in SSC examinations. There are two parts in the examination. These are Part – A and Part – B. Duration of the exam is 2-30 hours and maximum marks are 50. Candidates should note that they have to answer the questions under PART – A on a separate answer book. For Part – B of question paper, candidates should write answers on the question paper itself. Part – A will be for 30 marks and duration is 2 hours. Part – B is for 20 marks and duration is 30 minutes. Part – B will consist of bits in the form of objective multiple choice type and fill in the blanks. Here you can see and download the question papers:

SSC Telugu Model Question Papers

Following are model questions for AP Board SSC Half Yearly Public Examinations. These questions are for practice only. This may not resemble the structure of original questions paper.

S.S.C. Half Yearly Examinations
Mathematics Paper – II (Model Questions)

1. Find the equation of the line passing through (4, -3) and is perpendicular to the line 2x – 5y + 4 = 0
2. In what ratio does P(4, 6) divide the join of A (-2, 3) and B(6, 7).
3. The mean of 10 observations is 16.3. By an error, one observation is registered as 32 instead of 23. Find the correct mean.
4. Draw the structure of a computer.
5. Define Thales theorem.
6. Find the Y-intercept of a line 2x – 3y = 12.
7. Define Algorithm.
8. If AM = x, Median = y, then find the mode.
9. State and prove Pythagorean theorem.
10. Find the equation of the line that cuts off intercepts a & b on the X and Y-axes such that a + b = 3, ab = 2.
11. Find the equation of the line which passes through the point (1, -6) and whose product of the intercepts on the coordinate axes is one.
12. Solve the following simultaneous equations using matrix inversion method. 3x + 8y = 7, 6x – y = 31
13. A flagstaff stands on the top of a building. At a distance of 40 mts away from the foot of the building, the angle of elevation of the top of the flagstaff is 60° and the angle of elevation of the top of the building is 30°. Find the height of the flagstaff.

14. If two circles touch internally, then the number of their common tangents is ( )
A) 2 B) 1 C) 4 D) none.
15. Equation passing through the points (4, -7), (1, -5) is ( )
A) 2x – 3y + 13 = 0 B) 3x – 2y + 13 = 0 C) 2x + 3y – 13 = 0 D) 2x + 3y + 13 = 0
16. Which of the following pair is perpendicular ( )
A) y = 3x, x = 3y B) y = 3x, x = -3y C) y = 4, y = 6 D) none
17. Average of a – 2d, a – d, a + d, a + 2d is ( )
A) a B) d C) 3d D) 4a
18. The following generation used Transistors in computers ( )
A) First B) Second C) Third D) Fourth

18. Angles in the same segment of a circle are —-
19. Two circles are of radii 3 cm & 1 cm. The distance between their centres is 5 cm. The length of their transverse common tangent is ——
20. The line 3x + 4y = 0 cuts the Y-axis at —–
21. If P(6, -1), Q(1, 3), R(x, 8). If PQ = QR then x = —
22. If average of 10 observations is 7, average of 15 observations is 12, then the average of total observations is —–
23. All parts of a computer are controlled by —–