In the given fig, ABD is a triangle right angled at A and AC �
    • Zigya Logo

    Previous Year Papers

    Download Solved Question Papers Free for Offline Practice and view Solutions Online.

    Test Series

    Take Zigya Full and Sectional Test Series. Time it out for real assessment and get your results instantly.

    Test Yourself

    Practice and master your preparation for a specific topic or chapter. Check you scores at the end of the test.
    Advertisement

    Triangles

    Multiple Choice QuestionsShort Answer Type

    211. Prove that the area of an equilateral triangle described on one side of a square is equal to half the area of the equilateral triangle described on one of its diagonals. 
    590 Views
    Answer
    212. ABC and BDE are two equilateral triangles such that D is the mid-point of BC. Ratio of the areas of triangles ABC and BDE is
    (A) 2 : 1   (B) 1 : 2  (C) 4 : 1   (D) 1 : 4.
    128 Views
    Answer
    213.

    Sides of two similar triangles are in the ratio 4 : 9. Areas of these triangles are in the ratio
    (a) 2 : 3        (b) 4 : 9
    (c) 81 : 16    (d) 16 : 81.

    106 Views
    Answer

    Multiple Choice QuestionsLong Answer Type

    214. Sides of some triangles are given below. Determine which of them are right triangles. In case of a right angle, write the length of its hypotenuse.
    (i) 7 cm, 24 cm, 25 cm
    (ii) 3 cm, 8 cm, 6 cm
    (iii) 50 cm, 80 cm, 100 cm
    (iv) 13 cm, 12 cm, 5 cm.
    892 Views
    Answer
    Advertisement
    215. PQR is a triangle right angled at P and M is a point on QR such that PM ⊥ QR show that PM2 = QM × MR.
    283 Views
    Answer
    Advertisement
    Zigya App

    216.

    In the given fig, ABD is a triangle right angled at A and AC ⊥ BD. Show that
    (i) AB2 = BC .BD
    (ii) AC2 = BC. DC
    (iii) AD2 = BD . CD

    Proof : (i) In ∆BAC and ∆BDA,
    ∠BAC = ∠BDA    ...(i)
    In right triangle ABC, we have
    ∠BAC + ∠CBA = 90°    ...(ii)
    In right triangle ABD, we have
    ∠BDA + ∠CBA = 90°    ...(iii)
    Comparing (ii) and (iii), we get
    ∠BAC = ∠BDA
    And,    ∠ACB = ∠DAB
    [Each equal to 90°]
    ∴    ∆BAC ~ ∆BDA
    [Using AA similar condition]
    ∴                      BA over BD equals BC over BA
    [∵ Corresponding sides of two similar triangles are proportional]
    ⇒    BA2 = BC . BD
    ⇒    AB2 = BC . BD.

    (ii) In right triangle ACB and DCA,
    ∠ACB = ∠DCA = 90°
    ∠BAC = ∠ADC
    ∴    ∆ACB ~ ∆DCA
    [Using AA similar condition]
    ∴                 AC over DC equals BC over AC
    [∵  Corresponding sides of two similar triangles are proportional]
    ⇒    AC2 = BC × DC.

    (iii) In right triangle ADB and ∆CDA,
    ∠DAB = ∠DCA = 90°
    ∠BDA = ∠ADC (common)
    ∴    ∆ADB ~ ∆CDA
    [Using AA similar condition]
    ∴                       AD over CD equals BD over AD

    [∵ Corresponding sides of two similar triangles are proportional]
    ⇒    AD2 = BD × CD.

    214 Views
  • Switch Icon Switch
    • Advertisement

    Multiple Choice QuestionsShort Answer Type

    217. ABC is an isosceles triangle right angled at C. Prove that AB2 = 2AC2.
    233 Views
    Answer
    218. ABC is an isosceles triangle with AC = BC. If AB2 = 2AC2, prove that ∆ABC is a right triangle.
    844 Views
    Answer
    Advertisement

    Multiple Choice QuestionsLong Answer Type

    219. ABC is an equilateral triangle of side 2a. Find each of its altitudes.
    397 Views
    Answer
    220. Prove that the sum of the squares of the sides of a rhombus is equal to the sum of the squares of its diagonals.
    198 Views
    Answer
    Advertisement
    Flag Popup Icon
    Flag it
    Submit
    Flag Popup Icon
    Switch to
    flexipad
    Share It Icon
    Share it
    Share It
    Share it