Geometry Tricks - 1
(1) Be it algebra or geometry, such questions are always there that don't deserve your rough space.
Answer : (B)
Answer : (B)
Note : Such questions are rare in geometry and in most of the questions you will have to pick up your pen, but still I shared these questions just to unleash the jugaad within you. Moreover, if you are able to solve even a single question with such approach, you will save at least 1 crucial minute in the examination hall.
(2) In geometry too, my beloved concept of 'symmetry' plays an important role. If in any question you find that some symmetrical expressions/equations are given, you can assume the triangle to be equilateral.
Q. 1
In the above question you can assume that the triangle is equilateral. Then angles A, B and C will be 60. Hence sin2A + sin2B + sin2C = (√3/2)2 + (√3/2)2 + (√3/2)2 = 9/4
Note : If in any question, the sides of a triangle are given (like a, b and c), then you can assume a = b = c, but make sure any additional detail is not given. Like in the above question that I solved, some additional equations were given, but then too I supposed the triangle to be equilateral only because the equation was symmetrical. Had the equation been unsymmetrical, I could not have been able to assume a =b =c
Q. 2
Here the lengths of perpendiculars are given to be a, b and c. Note that
no additional information is given, hence it is safe to assume a = b =
c. Let the side of the triangle be 's'. The figure will look like this
-
We have to establish a relation between 'a' and 's'. In an equilateral
triangle, the incentre, orthocentre, circumcentre and centroid, all
coincide. So you can calculate 'a', by which ever method you like.
a = inradius = s/2√3 [The inradius of an equilateral triangle is s/2√3 and the circumradius is s/√3]
Hence s = 2√3a
We know the formula for calculating the area of an equilateral triangle = (√3/4)s2
= (√3/4) (2√3a)2
= 3√3a2
Now put a = b = c in all the options and check which one will give 3√3a2
A) √3a
B) 3√2a2
C) √2a
D) 3√3a2
Answer : (D)
I have found that SSC has some real love with 'Area of a triangle' and it keeps on asking it again and again under different contexts. Like in Tier 2 (2014) around 5 questions asked area of triangles.
Therefore it is very important that you memorize all the possible formulas to calculate it. This will save you a lot of time.
Note : All the below questions are taken from a single paper [Tier-2, 2014].
Formula 1 : (Applicable only for Right-Angled Triangle)
Q. 3
In the above question you may struggle to calculate the area. You can
try this question yourself (with a timer), to see how much time you are
taking...
There is a direct formula for such questions -
Apply this formula, area = (100^2 * sin30)/4 = 1250
Answer : (D)
Note : You can choose any of the angles of the triangle (except the 90 degree one) and you will get the same result. Like in the above question, the 3 angles of the triangle are 15, 75 and 90.
sin2*15 = sin30
sin2*75 = sin150
And we know that sin150 = sin30
Hence it doesn't matter which angle you take. But to avoid any confusion, always take the smaller angle (15 in this case).
Next question -
There is a direct formula for such questions -
Answer : (D)
Note : You can choose any of the angles of the triangle (except the 90 degree one) and you will get the same result. Like in the above question, the 3 angles of the triangle are 15, 75 and 90.
sin2*15 = sin30
sin2*75 = sin150
And we know that sin150 = sin30
Hence it doesn't matter which angle you take. But to avoid any confusion, always take the smaller angle (15 in this case).
Next question -
Q. 4
Again apply the same formula
Answer : (C)
Formula 2 : ½*b*c*sinϴ
This formula is only applicable when ϴ lies between the sides 'b' and 'c'.
Apply the formula, area = 1/2 * 10 * 10 * sin45
Answer : (D)
Formula 3 : Area of a triangle = r * S
where r = inradius
S = semi-perimeter
Answer : (C)
Formula 2 : ½*b*c*sinϴ
This formula is only applicable when ϴ lies between the sides 'b' and 'c'.
Q. 5
Apply the formula, area = 1/2 * 10 * 10 * sin45
Answer : (D)
Formula 3 : Area of a triangle = r * S
where r = inradius
S = semi-perimeter
Q. 6
Given, perimeter = 50, hence semi-perimeter = 25
Area = 6 * 25 = 150
Answer : (C)
Now when you know this formula, in Q. 2 above, where we had to establish relation between 's' and 'a', you can establish it by applying this formula too.
Area of an equilateral triangle = (√3/4)s2
Area of a triangle = inradius * semi-perimeter = a * (3s)/2
Now,
a * (3s)/2 = (√3/4)s2
or s = 2√3a [Same result]
Please Check the link for Part-2 and Part-3
Please Check the link for Part-2 and Part-3
0 Comment to " Geometry Tricks - 1 "
Post a Comment