SSC CGL Geometry Formulas: Complete List for Tier 1 and Tier 2 (2026)

Are you struggling to score well in the Advanced Maths section because you keep forgetting key theorems during the exam? Getting confused between different triangle centers or circle properties can cost you precious marks and lower your overall rank. The direct solution to this problem is mastering a structured sheet of SSC CGL Geometry Formulas that you can quickly review before your test. Geometry makes up a massive part of the exam, and having these properties at your fingertips will instantly boost your speed and accuracy. In this blog, we have provided all the important geometry formulas for your SSC CGL exam.

SSC CGL Geometry Formulas: Key Takeaways

• Geometry is one of the highest-weightage topics in SSC CGL, contributing approximately 4–7 questions in Tier 1 and 7–10 questions in Tier 2.
• Triangle formulas and theorems, including Centroid, Incenter, Circumcenter, Orthocenter, Pythagoras Theorem, and Apollonius Theorem, are among the most frequently asked concepts.
• Circle properties such as Chord Theorems, Tangent Theorems, Alternate Segment Theorem, and Common Tangent formulas are crucial for solving advanced geometry questions.
• Polygon angle formulas, Cyclic Quadrilateral properties, and Similarity & Congruency concepts are commonly tested and should be revised regularly.
• Maintaining a dedicated geometry formula sheet and practicing previous year SSC CGL questions can significantly improve speed, accuracy, and overall mathematics scores.

Dimensions of Geometry

Non-Dimensional Geometry

A point has no dimensions — no length, width, or height. It simply marks a position in space. In SSC CGL, points are used as a reference in angle and line problems.

One-Dimensional Geometry

A line has only length. Key line types tested in SSC CGL:

• Line Segment: Has two fixed endpoints.
• Ray: Starts at one point and extends infinitely in one direction.
• Straight Line: Extends infinitely in both directions.
• Parallel Lines: Two lines that never intersect; always equidistant.
• Perpendicular Lines: Two lines that meet at exactly 90°.
• Transversal: A line that cuts two or more parallel lines.

Also Read: SSC CGL Syllabus 2026 – Download Tier 1 and Tier 2 Syllabus PDF

Angles and Types of Angles in Geometry

An angle is formed when two rays share a common endpoint (vertex). Angle types you must know for SSC CGL:

Angle Type	Measure
Acute Angle	Greater than 0° and less than 90°
Right Angle	Exactly 90°
Obtuse Angle	Greater than 90° and less than 180°
Straight Angle	Exactly 180°
Reflex Angle	Greater than 180° and less than 360°
Complete Angle	Exactly 360°

• Complementary Angles: Two angles whose sum is 90°.
• Supplementary Angles: Two angles whose sum is 180°.
• Vertically Opposite Angles: When two lines intersect, the angles opposite each other are equal.

Parallel Lines Cut by a Transversal — Key Rules:

• Corresponding angles are equal (e.g., Angle 1 = Angle 5).
• Alternate interior angles are equal (e.g., Angle 3 = Angle 5).
• Interior angles on the same side of the transversal are supplementary (Angle 3 + Angle 6 = 180°).

Two-Dimensional Geometry

Two-dimensional (2D) geometry deals with flat shapes that have length and width but no depth.

Polygons

A polygon is a closed figure formed by three or more straight sides.

For a Regular Polygon with n sides:

• Sum of all interior angles = (n – 2) × 180°
• Each interior angle = [(n – 2) × 180°] / n
• Sum of all exterior angles = 360° (always, for any polygon)
• Each exterior angle = 360° / n
• Number of diagonals = n(n – 3) / 2
• Interior angle + Exterior angle = 180°

Quick Reference — Common Polygons:

Polygon	Sides (n)	Sum of Interior Angles	Each Interior Angle
Triangle	3	180°	60° (equilateral)
Quadrilateral	4	360°	90° (square)
Pentagon	5	540°	108°
Hexagon	6	720°	120°
Octagon	8	1080°	135°

Also Read: SSC CGL Salary 2026, Grade Pay, In Hand Salary, Job Profile and Career Growth

Triangle

A triangle is a three-sided polygon. It is the most tested shape in SSC CGL Geometry.

General Properties:

• Angle Sum Property: Sum of all three interior angles = 180°.
• Exterior Angle Theorem: An exterior angle = sum of the two non-adjacent interior angles.
• Side Inequality: Sum of any two sides > third side; difference of any two sides < third side.

Types of Triangles:

Type	Property
Equilateral	All three sides equal; all angles = 60°
Isosceles	Two sides equal; base angles equal
Scalene	All sides unequal
Right-Angled	One angle = 90°
Acute	All angles < 90°
Obtuse	One angle > 90°

Area Formulas for Triangles:

• Area = (1/2) × Base × Height
• Area (Heron’s Formula) = √[s(s-a)(s-b)(s-c)], where s = (a + b + c)/2
• Area of Equilateral Triangle = (√3/4) × a², where a = side
• Area using Sine Rule = (1/2) × a × b × sin C

Perimeter:

• Perimeter = a + b + c (sum of all three sides)
• Perimeter of Equilateral Triangle = 3a

Sine Rule and Cosine Rule:

For a triangle with sides a, b, c opposite to angles A, B, C:

• Sine Rule: a/sin A = b/sin B = c/sin C = 2R (where R = circumradius)
• Cosine Rule: cos A = (b² + c² – a²) / (2bc)

The Four Triangle Centers — Most Tested in SSC CGL:

Center	Formed By	Key Formula / Property
Centroid (G)	Intersection of Medians	Divides each median in ratio 2:1 from vertex
Incenter (I)	Intersection of Angle Bisectors	Angle BIC = 90° + (A/2); Inradius r = Area / s
Circumcenter (O)	Intersection of Perpendicular Bisectors	Angle BOC = 2 × Angle A; R = abc / (4 × Area)
Orthocenter (H)	Intersection of Altitudes	Angle BHC = 180° – Angle A

Pro Tip for SSC CGL: In an equilateral triangle, Centroid, Incenter, Circumcenter, and Orthocenter all coincide at the same point. The ratio of Circumradius (R) to Inradius (r) in an equilateral triangle is always 2 : 1. The ratio of the area of the circumcircle to the incircle of an equilateral triangle is always 4 : 1.

Check SSC CGL Cut-Off to know the minimum marks required to crack the exam.

Right-Angled Triangle — Special Formulas:

For a right-angled triangle with the right angle at B, and BD perpendicular to AC:

• Pythagoras Theorem: AB² + BC² = AC²
• BD = (AB × BC) / AC
• AD = AB² / AC
• CD = BC² / AC
• 1/BD² = 1/AB² + 1/BC²
• Circumradius R = Hypotenuse / 2
• Inradius r = (Base + Perpendicular – Hypotenuse) / 2

Important Triangle Theorems:

Mid-Point Theorem: A line joining the midpoints of two sides of a triangle is parallel to the third side and equal to half of it.

Apollonius Theorem (Median Formula): If AD is the median to side BC:

• AB² + AC² = 2(AD² + BD²)

Interior Angle Bisector Theorem: If AD bisects angle A and meets BC at D:

• AB / AC = BD / DC

Similarity of Triangles: If Triangle ABC is similar to Triangle PQR:

• AB/PQ = BC/QR = AC/PR
• Ratio of Perimeters = AB/PQ (same as the side ratio)
• Ratio of Areas = (AB/PQ)² = (side ratio)²

Quadrilaterals

A quadrilateral is a four-sided polygon with an angle sum of 360°.

Area and Perimeter Formulas:

Shape	Area	Perimeter
Square (side a)	a²	4a
Rectangle (l × b)	l × b	2(l + b)
Parallelogram (base b, height h)	b × h	2(a + b)
Rhombus (diagonals d1, d2)	(1/2) × d1 × d2	4a
Trapezium (parallel sides a, b; height h)	(1/2) × (a + b) × h	Sum of all sides

Properties:

• Diagonals of a parallelogram bisect each other.
• Diagonals of a rectangle are equal and bisect each other.
• Diagonals of a rhombus bisect each other at 90°.
• Diagonals of a square are equal and bisect each other at 90°.

Circles

A circle is a set of all points equidistant from a fixed center point.

Basic Formulas:

• Circumference = 2πr = πd
• Area = πr²
• Length of Arc = (θ/360°) × 2πr
• Area of Sector = (θ/360°) × πr²
• Area of Segment = Area of Sector – Area of Triangle

Chord Properties:

• Perpendicular from the center to a chord bisects the chord.
• Equal chords are equidistant from the center.
• Equal chords subtend equal angles at the center.
• Longer chords are closer to the center.

Angle Properties:

• The angle subtended by an arc at the center is double the angle at any point on the remaining arc.
• Angle in a semicircle is always 90°.
• Angles subtended by the same arc in the same segment are equal.

Tangent Properties:

• A tangent is perpendicular to the radius at the point of contact.
• Two tangents drawn from an external point to a circle are equal in length.
• Angle between a tangent and a chord = angle in the alternate segment (Alternate Segment Theorem).

Intersecting Chords Theorem (Inside the Circle): If chords AB and CD intersect at point P inside the circle: PA × PB = PC × PD

Secant-Secant Theorem (Outside the Circle): If two secants AB and CD meet at external point P: PA × PB = PC × PD

Tangent-Secant Theorem: If a tangent PT and a secant PAB are drawn from external point P: PT² = PA × PB

Common Tangents to Two Circles: Let d = distance between the centers; r1 and r2 are the radii:

• Length of Direct Common Tangent (DCT) = √[d² – (r1 – r2)²]
• Length of Transverse Common Tangent (TCT) = √[d² – (r1 + r2)²]

Number of Common Tangents:

Condition	Number of Common Tangents
Circles are separate (d > r1 + r2)	4 tangents (2 direct, 2 transverse)
Circles touch externally (d = r1 + r2)	3 tangents
Circles intersect at two points	2 tangents
Circles touch internally (d = r1 – r2)	1 tangent
One circle inside another (d < r1 – r2)	0 tangents

Three-Dimensional Geometry

Three-dimensional (3D) geometry deals with shapes that have length, width, and height. In SSC CGL, 3D geometry is tested primarily under Mensuration, but Tier 2 also includes some coordinate geometry of 3D lines.

Surface Area and Volume — Quick Reference:

Shape	Total Surface Area (TSA)	Volume
Cube (side a)	6a²	a³
Cuboid (l, b, h)	2(lb + bh + lh)	l × b × h
Cylinder (r, h)	2πr(r + h)	πr²h
Cone (r, l, h)	πr(r + l)	(1/3)πr²h
Sphere (r)	4πr²	(4/3)πr³
Hemisphere (r)	3πr²	(2/3)πr³

Note: For a cone, slant height l = √(r² + h²).

Read the complete SSC CGL notification for more details related to the exam.

Measurement in Geometry

Measurement in Two-Dimensional Geometry

All 2D measurement formulas (area, perimeter, arc length) are listed in the shape-specific sections above. The key principle is:

• Perimeter = total boundary length of a 2D figure.
• Area = total region enclosed by the boundary of a 2D figure.
• For composite figures, break them into standard shapes and add or subtract areas.

Similarity and Congruency in Geometry

Congruent figures are identical in shape and size. All corresponding sides and angles are equal.

Congruency Rules for Triangles: SSS, SAS, ASA, AAS, RHS.

Similar figures have the same shape but may differ in size.

If Triangle ABC is similar to Triangle PQR:

• Corresponding angles are equal: Angle A = Angle P, Angle B = Angle Q, Angle C = Angle R.
• Ratio of sides: AB/PQ = BC/QR = AC/PR = k (constant ratio)
• Ratio of Perimeters = k
• Ratio of Areas = k²
• Ratio of corresponding medians = k
• Ratio of corresponding altitudes = k

Similarity Rules for Triangles: AA, SSS (ratio), SAS (ratio).

A very important SSC CGL result: If two triangles are similar with ratio k, the ratio of their areas is k². For example, if the sides are in ratio 3:4, the areas are in ratio 9:16.

Measurement in Three-Dimensional Geometry

Direction Cosines of a Line

For a line making angles α, β, γ with the positive X, Y, and Z axes respectively:

• l = cos α, m = cos β, n = cos γ
• l² + m² + n² = 1 (This is always true for direction cosines.)

Direction Ratios of a Line

Direction ratios are proportional to direction cosines. If direction ratios are a, b, c, then:

• l = a / √(a² + b² + c²)
• m = b / √(a² + b² + c²)
• n = c / √(a² + b² + c²)

Equation of a Line in 3D Geometry

Symmetric Form (Standard Cartesian Equation): (x – x1)/a = (y – y1)/b = (z – z1)/c

Where (x1, y1, z1) is a point on the line and a, b, c are direction ratios.

Two-Point Form: (x – x1)/(x2 – x1) = (y – y1)/(y2 – y1) = (z – z1)/(z2 – z1)

Angle Between Two Lines

If two lines have direction cosines (l1, m1, n1) and (l2, m2, n2): cos θ = |l1·l2 + m1·m2 + n1·n2|

If direction ratios are (a1, b1, c1) and (a2, b2, c2): cos θ = |a1a2 + b1b2 + c1c2| / [√(a1² + b1² + c1²) × √(a2² + b2² + c2²)]

For perpendicular lines: a1a2 + b1b2 + c1c2 = 0 For parallel lines: a1/a2 = b1/b2 = c1/c2

Skew Lines in Geometry

Skew lines are lines that are neither parallel nor intersecting — they exist in different planes. Skew lines can only exist in 3D space, not in a 2D plane.

Key Properties:

• Skew lines have no common point.
• They are not parallel.
• The shortest distance between two skew lines is always along the line perpendicular to both.

Shortest Distance Between Two Skew Lines: For lines r = a1 + λb1 and r = a2 + μb2: d = |(a2 – a1) · (b1 × b2)| / |b1 × b2|

For SSC CGL Tier 2, skew lines are a conceptual topic. You are more likely to be tested on whether two lines are skew, parallel, or intersecting — rather than computing exact distances.

Edges, Faces, and Vertices in Solid Shapes

For SSC CGL, Euler’s Formula is the key result here:

Euler’s Formula: F + V – E = 2 Where F = Faces, V = Vertices, E = Edges.

Solid Shape	Faces (F)	Vertices (V)	Edges (E)	F + V – E
Cube	6	8	12	2
Cuboid	6	8	12	2
Triangular Prism	5	6	9	2
Square Pyramid	5	5	8	2
Tetrahedron	4	4	6	2

Properties of Geometry (Key SSC CGL Results)

These properties are directly tested — memorise each one.

Cyclic Quadrilateral Properties:

• Sum of opposite angles = 180° (Angle A + Angle C = 180°; Angle B + Angle D = 180°).
• An exterior angle of a cyclic quadrilateral = the interior opposite angle.
• Ptolemy’s Theorem: (AB × CD) + (BC × AD) = AC × BD

Angle Bisector Properties:

• If the internal bisector of Angle B and external bisector of Angle C of Triangle ABC meet at P, then: Angle BPC = Angle A / 2.
• The external bisector of an angle in a triangle divides the opposite side externally in the ratio of the adjacent sides.

Star (5-Pointed Star) Property:

• The sum of all five vertex angles of a 5-pointed star = 180°.

Equilateral Triangle — Quick Facts:

• All four centers (Centroid, Incenter, Circumcenter, Orthocenter) coincide.
• R : r = 2 : 1 (Circumradius to Inradius).
• Area of circumcircle : Area of incircle = 4 : 1.
• Height = (√3/2) × side.

Median and Altitude Properties:

• A median divides a triangle into two triangles of equal area.
• The centroid divides each median in ratio 2:1 (from vertex to midpoint of opposite side).
• In an equilateral triangle, median = altitude = angle bisector = perpendicular bisector.

Circle + Triangle Combination:

• Angle in a semicircle = 90°.
• The angle subtended by an arc at the center = 2 × angle at the circumference.
• Tangent to a circle is perpendicular to the radius at the point of contact.
• Angle between tangent and chord = Angle in the alternate segment.

Branches of Geometry

Geometry is divided into three practical branches:

• Plane Geometry (2D): Deals with flat shapes — triangles, quadrilaterals, circles, and polygons. This is the dominant geometry type in both Tier 1 and Tier 2.
• Solid Geometry (3D): Deals with three-dimensional figures — cubes, cylinders, cones, spheres, and prisms. Questions here overlap heavily with Mensuration.
• Coordinate Geometry: Deals with points, lines, and shapes on the XY plane using algebraic equations. It appears in Tier 2 and includes concepts like the distance formula, section formula, and the equation of a line.

Download free SSC CGL geometry questions PDF and practice exam-level questions

Properties of Geometry

• Shapes and Figures: Geometry studies two-dimensional shapes such as triangles, circles, squares, and polygons, as well as three-dimensional figures like cubes, cones, cylinders, and spheres.
• Lines and Angles: It explains the properties and relationships of lines, rays, line segments, and angles, which form the foundation of geometric concepts.
• Symmetry: Many geometric shapes possess symmetry, where one part of a figure mirrors another, making patterns easier to identify and analyze.
• Measurement: Geometry helps calculate important measurements such as perimeter, area, surface area, and volume using standard formulas.
• Position and Space: It describes the location, arrangement, and distance between objects in a plane or three-dimensional space.
• Transformations: Geometry studies how figures change through reflection, rotation, translation, and scaling while maintaining specific properties.
• Similarity and Congruence: It examines relationships between shapes, including similar figures that share the same shape and congruent figures that are identical in both shape and size.

Applications of Geometry in SSC CGL

Understanding where and how geometry appears in the exam helps you allocate study time correctly.

• In Tier 1 (Quantitative Aptitude — 25 Questions): Geometry contributes 4–6 questions per shift. Most questions are on Triangle properties (especially angle bisectors, medians, and the four centers), Circle theorems (tangents and chord intersections), and Polygon angle calculations.
• In Tier 2 (Mathematical Abilities — 30 Questions): Geometry becomes harder and more formula-heavy. Expect 7–10 questions combining Geometry with Mensuration (finding areas/volumes using geometric properties). Apollonius Theorem, Common Tangents, Cyclic Quadrilateral properties, and Coordinate Geometry of lines are all fair game.
• Real-World Tip for SSC CGL Preparation: SSC repeats question patterns year after year. The same geometric configurations — a right triangle with an altitude drawn to the hypotenuse, two circles with common tangents, a cyclic quadrilateral with one angle given — appear across multiple years in different numerical forms. Recognising the pattern is faster than re-deriving the formula. Practice geometry PYQs (2019–2025) after you finish this formula sheet.

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Other Blogs of SSC CGL
SSC CGL Notification	SSC CGL Syllabus
SSC CGL Study Plan	SSC CGL Exam Pattern
SSC CGL Cut Off	SSC CGL Preparation Strategy
SSC CGL Previous Year Question Papers

SSC CGL Geometry Formulas — FAQs

What are the types of lines in geometry?

The main types of lines are: straight line (extends infinitely in both directions), line segment (fixed endpoints), ray (one endpoint, extends infinitely in one direction), parallel lines (never meet), perpendicular lines (meet at 90°), and transversal (crosses two or more lines).

What are the uses of geometry in SSC CGL?

In SSC CGL, geometry is used to solve problems involving land measurement, construction dimensions, angle calculations, and distance problems. In the exam, it directly translates to questions on triangle properties, circle theorems, polygon angles, and 3D volume/surface area problems.

What are the types of angles in geometry?

The types of angles are: Acute (0°–90°), Right (exactly 90°), Obtuse (90°–180°), Straight (exactly 180°), Reflex (180°–360°), and Complete or Full angle (exactly 360°). Pairs include Complementary (sum 90°), Supplementary (sum 180°), and Vertically Opposite (equal angles at intersection).

What are the types of geometry?

The main types of geometry are: Euclidean Geometry (flat space, most of SSC CGL syllabus), Coordinate/Analytical Geometry (shapes using algebraic equations on XY plane), Solid/3D Geometry (three-dimensional figures), and Non-Euclidean Geometry (curved surfaces — not tested in SSC CGL).

How many questions come from Geometry in SSC CGL?

Geometry contributes approximately 4–6 questions in SSC CGL Tier 1 and 7–10 questions in Tier 2 (when Mensuration overlap is included). It is one of the highest-weightage topics in the Advance Mathematics section and should be a priority for every candidate.

Which geometry formulas are most important for SSC CGL Tier 2?

The most important geometry formulas for Tier 2 are: Triangle Centers (Centroid, Incenter, Circumcenter, Orthocenter), Apollonius Theorem, the four right-triangle altitude formulas (BD = AB×BC/AC, etc.), Circle tangent theorems (PA×PB = PT²), Common Tangent lengths, and Cyclic Quadrilateral properties. These appear repeatedly across shifts.