SQUARE#!#RECTANGLE

Suggest a universal set for the following : A={ Parallelogram , Rhombus} B ={Rectangles , Squares} C={Trapezium}

Introduction||Area OF square||Rectangle||Circle||triangle||Perimeter OF circle|| Triangle||square and rectangle||Quadrilateral||Hexagon||Pentagon||Semi Perimeter OF Triangle||ProOF OF Heron's Formula

Statements: All squares are triangles No triangles is circle All circles are rectangles Conclusions: I. No rectangles is square II. All rectangles being square is a possibility

Statements:- No squares are rectangles. All rectangles are triangles. Conclusions:- I. Some triangles are squares. II. Some triangles are rectangles.

State True or False The circle, the square, the rectangle and the triangle are examples of plane figures.

Which conclusions is true with respect to the given statements ? Statements : I. All squares are rectangles. II. All rectangles are polygons. Conclusions :

Parallelogram|Properties Of Parallelogram|Question Practice|Rhombus|Properties Of Rhombus|Rectangle |Properties Of Rectangle|Square|Properties Of Square|OMR

Chapter test -3 construct OF rectangle|| Square|| Rhombus and triangle

Let P,Q,R and S be the points on the plane with position vectors -2i-j,4i,3i+3j and -3j+2j respectively.The quadrilateral PQRS must be a Parallelogram,which is neither a rhombus nor a rectangle Square Rectangle,but not a square Rhombus,but not a square