The post 9th CBSE Mathematics Mid Term Unsolved Paper 2019 appeared first on Class Notes.

]]>- All the questions are compulsory.
- The question paper consists of 40 questions divided into 5 sections.
**Section A**consists of**16 questions of 1 mark each.**

**Section B**consists of**3 questions of 2 marks each.**

**Section C**consists of**8 questions of 3 marks each.**

**Section D**consists of**6 questions of 4 marks each.**

**Section E**consists of**7 questions of 3-D**Dexture.- There is no overall cchoice. However an internal choice has been provided.
- Use of calculator is not permitted.

Q 1. There can be _______ many irrational numbers between two numbers on the number line.

Q 2. A polynomial of degree __________ is called constant polynomial.

Q 3. Co-ordinates of a point on the x-axis are of the form ________.

Q 4. Find the rational number among the following numbers:

- √64/8
- √98
- √98/√2
- √14

Q 5. The radius of a sphere i 2r, than the volume will be

- 4/3 πr³
- 4πr³
- 8πr³/3
- 32/3 πr³

Q 6. An exterior angle of a triangle is 105° and its two interior opposite angles are equal. Each of these equal angle is:

- 37.5°
- 52.5°
- 72.5°
- 75°

Q 7. Three angles of a quadrilateral are 75°, 90° & 55°, find the fourth angle.

Q 8. Find the volume of sphere in terms of II whose diameter is 6 cm.

Q 9. Find the length of each side of an equilateral triangle having an area of 9√3 cm².

Q 10. In ΔPQR, PQ = PR and ∠Q = 65°, then find ∠R.

Q 11. Can a triangle have all the angles less than 60°? Give reason.

Q 12. Zero is a rational number.

Q 13. *x* + 2√*x* + 1 is a polynomial.

Q 14. Two circle of same radii are congruent.

Q 15. Point (0, -7) lies in IV Quadrant.

Q 16. There cannot be more than one obtuse angle in a triangle.

Q 17. If (*x* + 1) is a factor of *ax*³ + 2*x* + 4*a* – 9. Find the value of a.

Q 18. Prove that each angle of an equilateral triangle is 60°.

OR

In the given fig.

∠B < ∠A and ∠C < ∠D

Show that AD<BC

Q 19. The circumference of the base of a cylindrical vessel is 132 cm and its height is 25 cm. How many liters of water can it hold?

Q 20. Find the value of a and b.

7 + √5 / 7 – √5 – 7 – √5 / 7 + √5 = *a + *7/11 √5b

OR

(b) Locate √2 on a number line. [1½]

Q 21. If the polynomial *a*z³ + 4z² + 3z – 4 and z³ – 4z + *a* leaves the same remainder when divided by z – 3, find the value of a.

OR

Simplify: (*a* + b + c)² – (*a* – b – c)² + 4b² – 4c²

Q 22. In fig. if AB||CD,

CD||EF and y:z = 3:7

Find *x*

OR

It is given that ∠XYZ = 64° and XY is produced to point P. Draw a figure from the given information. If ray YQ bisects ∠ZYP find ∠XYQ and reflex ∠QYP.

Q.23. In figure, AB is a line segment and P is its mid point.

D and E are points on the same side of AB such

that ∠BAD = ∠ABE and ∠EPA = ∠DPB. Show that

- ΔDAP ≅ ΔEBP
- AD = BE

Q 24. A field is in the shape of a trapezium whose parallel sides are 25 m and 10 m. The non parallel sides are 14 m and 13 m. Find the area of the field.

Q.25. In figure, Diagonal AC of a parallelogram

ABCD bisect ∠A. Show that:

- It bisects ∠C also.
- ABCD is a rhombus.

OR

Show that the diagonals of a rhombus are perpendicular to each other.

Q 26. Curved surface area of a cone is 308 cm² and its slant height is 14 cm. Find

- radius of base
- Total surface area of the cone.

Q 27. A patient in a hospital is given soup daily in a cylindrical bowl of diameter 7 cm. If the bowl is filled soup to a height of 4 cm, how much soup the hospital has to prepare daily to serve 250 patients?

Q 28. If *a* = 3 + 2√2, find the value of

Q 29. By actual division, find the quotient and remainder when 3*x*^{4} – 4*x*³ – 3*x* – 1 is divided by *x* + 1.

OR

If *a* + b + c = 6 and and *a*b + bc + c*a* = 11, then find the value of *a*³ + b³ + c³ – 3*a*bc

Q 30. Plot the points A (2,0), B(5,0) and C (5,3). Find the coordinates of the point D such that ABCD is a square. Find the area and perimeter of square.

Q 31.

Two side AB and BC and median AM of one triangle ABC are respectively equal to sides PQ and OR and median PN of ΔPQR.

Show that:

- ΔABM ≅ ΔPQN
- ΔABC ≅ ΔPQR

OR

In fig., PR>PQ and PS bisects

∠QPR. Prove that ∠PSR > ∠PSQ.

Q 32. Twenty seven solid iron spheres each of radius r¹ and surface area S are melted to form a sphere with surface area S¹. Find the

- radius r¹ of the new sphere
- ratio of S and S¹

OR

Volume of the two spheres are in the ratio 125:27. Find the ratio of their surface areas.

Q 33. ABC is a triangle right angled at C. A line through the mid point M of hypotenuse AB and parallel to BC intersect AC at D. Show that

- D is the mid point of AC
- MD⊥AC
- CM = MA = ½ AB

Q 34. ________ 3D Printing technology was invented by Chuck Hull in 1983. [1]

Q 35. _________ 3D Printing technology used in our school. [1]

Q 36. Which of the following software we used in 3D printing? [1]

- Designing software
- Slicing software
- None of above
- both (a) and (b)

Q 37. The name of the material we use for 3D printing is [1]

- Acrylonitrile Butadirne Styrene
- Polylactic acid
- Poly carbonated acid
- Nylon

Q 38. Give a brief introduction of smart city? [2]

Q 39. What is the difference between alternating current and direct current? What is I.C. and write its full form. [2]

Question: What is the diameter of the filament you use in 3D Printer? What is the full form of FDM? [2]

OR

What is alternating current? From where you obtained AC & DC?

The post 9th CBSE Mathematics Mid Term Unsolved Paper 2019 appeared first on Class Notes.

]]>The post 9th Mathematics Pre-Mid Exam Question Paper (2019-20) appeared first on Class Notes.

]]>- All questions are compulsory.
- This question paper consists of 40 questions divided into five sections – A, B, C, D and 3-D DEXTER.
- Section-A contains 16 questions of 1 mark each.

Section-B contains 3 questions of 2 mark each.

Section-C contains 8 questions of 3 mark each.

Section-D contains 6 questions of 4 mark each.

3-D DEXTER contains 4 questions of 1 mark each and 3 questions of 2 marks each. - Use of Calculators is not permitted.

∠TSQ = 75°, find ∠SQT.

- mirror image of P(-1, 4) in x – axis.
- perpendicular distance of Q(-2, -4) from x axis.
- abscissa of the point R(3, 0).

(a) plot the point P, Q and R on graph.

(b) find the coordinates of the missing vertex S.

(c) find the area and perimeter of PQRS.

- Find the area of ΔABC using Heron’s formula.
- If its perimeter is 180 cm, what will be the area of the triangle.

- Rectangle tool
- Offset tool
- Rotate tool
- Push Pull

The post 9th Mathematics Pre-Mid Exam Question Paper (2019-20) appeared first on Class Notes.

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