Advance maths is one of the most important subjects that you need to focus on if you want to take the entrance examination for the various vacancies presented in the Staff Selection Commission. You must have a proper Advanced Math Notes For SSC CGL PDF in order to prepare for this section because it requires a lot of practice and a lot of knowledge. You will first have to remember all of the formulas that you need to use in order to solve the questions before digging into your practice. Given below we have shared some of the most important specifications regarding the Advance Maths Notes – Quant Study Notes for SSC.
Check Out Mock Tests For SSC Exam Here
Advance Maths Notes
Advance Math Notes PDF will be really helpful for the people who are preparing for various entrance examinations which will be conducted by the staff selection commission to select the candidates. The candidates will have to go through the preliminary examination and also the main examination in order to successfully get a chance to serve the SSC organisation. You have to go through practical questions in order to successfully get proper knowledge for the advanced maths section because you cannot do Maths without undergoing special practice and also study sessions with the well known experts of the industry.
Practical Questions For Advance Maths
Given below we have shared some of the most important practical questions that you can practice in order to prepare for the advanced maths subject in the Quant question paper which will be available for the Staff Selection Commission entrance examination. You will first have to check out the SSC Advance Math Formula PDF in order to complete these questions.
1.The side QR of an equilateral triangle PQR is produced to the point SIN such a way that QR = RS and P is joined to S. Then the measure of ∠PSR is?
- A 30∘
- B 15∘
- C 60∘
- D 45°
Answer- A
- If the incentre of an equilateral triangle lies inside the triangle and its radius is 3cm, then the side of the equilateral triangle is
- A 9 √3cm
- B 6 √3cm
- C 3√3 cm
- D \(6 cm\)
Answer- B
- If \(ABC\) is an equilateral triangle and \(P, Q, R\) respectively denote the middle points of \(AB , BC , CA\) then
- PQR must be an equilateral triangle
- B \(PQ + QR + PR = AB\)
- C \(PQ + QR + PR =2 AB\)
- D PQR must be a right angled triangle
Answer- A
- Let ABC be an equilateral triangle and AX, BY, CZ be the altitudes. Then the right statement out of the four given responses is-
- A \(AX = BY = CZ\)
- B \(AX \neq BY = CZ\)
- C \(AX = BY \neq CZ\)
- D \(AX \neq BY \neq CZ\)
Answer- A
- ABC is an equilateral triangle and CD is the internal bisector of \ (\angle\)C. If DC is produced to E such that \(AC = CE ,\) then \(\angle CAE\) is equal to-
- A \(45^{\circ}\)
- B \(15^{\circ}\)
- C \(30^{\circ}\)
- D \(75^{\circ}\)
Answer- B
- The radius of the incircle of the equilateral triangle having each side \(6 cm\) is-
- A \(2 \sqrt{3} cm\)
- B \(\sqrt{3} cm\)
- C \(6 \sqrt{3} cm\)
- D \(2 cm\)
Answer- B
- The side BC of a triangle ABC is extended to D. If \(\angle ACD =120^{\circ}\) and \(\angle ABC =\frac{1}{2}\angle CAB ,\) then the value of \(\angle ABC\) is
- \(80^{\circ}\)
- \(60^{\circ}\)
- \(40^{\circ}\)
- \(20^{\circ}\)
Answer- C
- If the three angles of a triangle are- \(\left(x+15^{\circ}\right), \quad\left(\frac{6 x}{5}+6^{\circ}\right) \quad\) and \(\left(\frac{2 x} {3}+30^{\circ}\right),\) then the triangle is-
- A isosceles
- B right angled
- C equilateral
- D scalene
Answer- C
- Let ABC be an equilateral triangle and AD perpendicular to BC. Then \(A B^{2}+B C^{2}+C A^{2}=?\)-
- A \(2 AD ^{2}\)
- B \(3 AD ^{2}\)
- C \(4 AD ^{2}\)
- D \(5 AD ^{2}\)
Answer- C
- The centroid of an equilateral triangle \(ABC\) is \(G\) and \(AB =10 cm\) The length of \(AG (\text { in } cm\) ) is-
- A \(3 \frac{1}{3}\)
- B \(\frac{10}{2 \sqrt{3}}\)
- C \(\frac{10 \sqrt{3}}{3}\)
- D \(\frac{\sqrt{3}}{3}\)
Answer- C
Check Out Video Lessons For SSC Exam Here
You must prepare for advanced maths subjects by taking proper coaching from the experts who have been working in the subjects for a long time because this is really a difficult subject. Entri provides one-on-one coaching to all of the people who are preparing for entrance examinations and want to have perfect knowledge regarding the subjects which will be included in this prestigious entrance examination so that they can crack the examination in just one go. You can get video lessons and also sample papers available at the platform for your practice. Enrol now!
