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Monashree Sur
Subject: Maths
, asked on 28/8/17
Solve this:
Problem 3. ABCD is a square. C' is a point on BA and B' is a point on AD such that BB' and CC' are perpendicular. Show that AB'B and BC'C are congruent.
Answer
1
Aryan Jaggi
Subject: Maths
, asked on 28/8/17
What is common angle ???
Answer
4
Devesh Kumar Biswal
Subject: Maths
, asked on 28/8/17
Please slove question 16
16. If the altitudes of a triangle are in the ratio 2:3:4, then the lengths of the corresponding sides are in the ratio
(A) 2:3:4
(B) 6:4:3
(C) 3:2:4
(D) 3:2:1
Answer
1
Dev
Subject: Maths
, asked on 27/8/17
1 and 2 from the book
Answer
2
Rishabh
Subject: Maths
, asked on 27/8/17
Q4. Solution this is of ncert
Answer
4
Palak Agarwal
Subject: Maths
, asked on 26/8/17
in a triangle ABC sides AB and AC are produced to points P and Q respectively .if the bisectors of BO and OC of angle CBD and angle BCQ respectively meet at point O .prove that the BOC is equal to half of y+z.
Answer
3
Devesh Kumar Biswal
Subject: Maths
, asked on 25/8/17
Plz slove the question
Answer
1
Devesh Kumar Biswal
Subject: Maths
, asked on 25/8/17
Please slove question 10
Answer
3
Devesh Kumar Biswal
Subject: Maths
, asked on 25/8/17
Please slove question 17
Answer
2
Devesh Kumar Biswal
Subject: Maths
, asked on 25/8/17
Please slove question 16
Answer
2
Devesh Kumar Biswal
Subject: Maths
, asked on 25/8/17
Please slove question 16
Answer
1
Suvam
Subject: Maths
, asked on 25/8/17
Solve this:
4. AD is an altitude of an isosceles triangle ABC is which AB = AC. Prove that
∠
BAD =
∠
DAC.
Answer
2
Suvam
Subject: Maths
, asked on 25/8/17
Solve this:
Answer
3
Undefined
Subject: Maths
, asked on 24/8/17
What is x in this given fig.
Answer
2
Suvam
Subject: Maths
, asked on 24/8/17
Solve this:
Answer
1
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Problem 3. ABCD is a square. C' is a point on BA and B' is a point on AD such that BB' and CC' are perpendicular. Show that AB'B and BC'C are congruent.
16. If the altitudes of a triangle are in the ratio 2:3:4, then the lengths of the corresponding sides are in the ratio
(A) 2:3:4
(B) 6:4:3
(C) 3:2:4
(D) 3:2:1
4. AD is an altitude of an isosceles triangle ABC is which AB = AC. Prove that BAD = DAC.