SSC CGL Tier-2 Exam Analysis: The staff selection commission has conducted the SSC CGL Tier-2 examination. This exam consisted of English language and quantitative aptitude with 200 marks allotted to each subject. Right after the exam, the candidates must be looking for the exam analysis in order to get an overview of the exam that they gave and to analyze their own performance. In this article, we will be discussing the Exam Analysis of SSC CGL Tier-2.
SSC CGL Tier-2 Exam analysis
Let’s have a look at the section-wise exam analysis for SSC CGL Tier-2 in detail and the types of questions that were asked this year.
Quantitative abilities [Moderate]
This section in this year’s exam consisted of arithmetic and advanced maths. As per the reviews of the aspirants who appeared for this examination this section was seen to be of easy to moderate level. Let’s have a look at the topic Wise distribution of questions that were asked in the table given below.
|S.No.||Topics||Number Of Questions||Level of difficulty|
|3||Time & Work , Pipe & Cistern||6||Easy-moderate|
|4||Profit & Loss , Discount||10||Easy|
|5||Ratio, Mixture & Alligation||6||Easy|
|6||Time Speed Distance , Boat & Stream Trains||4||Easy-moderate|
|7||Interest (CI & SI)||4||moderate|
|10||Trigonometry, Height & Distance||6-7||moderate|
|13||Surds & Indices , Simplification||2||easy|
Let us look at some questions that were collected by our experts from the students who appeared for the examination.
Q. AB is diameter of a circle with centre ‘O’ and ABCD is a cyclic quadrilateral, ∠COD = 60°, On extending AD and BC they meet at P. Find ∠APB.
Q. ABC is a triangle in which ∠CAB = 80° and ∠ABC = 50°, AE, BF and CD are the altitudes and O is the orthocenter. What is the value of ∠AOB ?
Q.ABC is a right angle triangle ∠B = 90° and BD is the median. O is the centroid of triangle. Find the length of OB if AB = 9 cm and AC = 41 cm.
Q.∆ABC is drawn to circumscribe a circle of radius 4 cm such that the segment BD and DC into which BC is devided by point of contact D are of length 8 cm and 6 cm respectively.Find sides AB and AC?
Q.A semi-circle is drawn with AB as its diameter. From C, a point on AB, a line perpendicular to AB is drawn meeting the circumference of the semi-circle at D. Given that AC = 2 cm and CD = 6 cm, the area of the semi-circle (in sq cm) will be :