Calculate the corresponding square yards value for 63 square feet
Solution: Given:
63 square feet
To convert from the square feet to square yards divide the given value by 9.
= 63/9
= 7 63 square feet = 7 square yards
equation of band from two points:
Before traveling to "equation of band from two points" we charge to apperceive what in fact is an equation. An blueprint is a algebraic account that two expressions are equal. Here the two expressions will cover y-coordinate, x-coordinate , abruptness and a constant.
The accepted anatomy of an blueprint of a band is
y=mx+b.
where m--> abruptness of the line.
b--> y-intercept.
y--> y-coordinate.
x-->x-coordinate.
How to divide decimals, Decimals can be divided in different ways:
1) Remove the decimal
2) Convert it in to normal form
3) Cancel the like terms
4) Represent the answer in fractions or decimals.
5) While representing in decimals be cautious about decimal point.
Examples on how to divide decimals 0.32 and 0.16?
Given decimals:
0.32=32/100
0.16=16/100
Division= 32/100/(16/100)
=32/16
2(16x2=32)
In geometry a polygon is geometrically a plane figure that is bounded by a closed path or circuit, composed of a finite sequence of straight line segments (i.e., by a closed polygonal chain). These segments are known as its edges or sides, and the points where two edges meet are the polygon's vertices or corners. The interior of the polygon is sometimes called its body. A polygon is a 2-dimensional example of the more common polytope in any number of dimensions.
Also get help with what is tangent
The word "polygon" derives from the Greek ("many") and (gōnia), meaning "knee" or "angle". Today a polygon is usually understood in terms of sides.
Here An arc is a segment which is closed, of a differentiable curve in the two-dimensional plane; for example, a circular arc is a segment of the circumference of a circle.And If the arc segment occupies a greater circle (or great ellipse), it is considered a great-arc segment.
An arc length of a circle(with radius r) and subtending an angle [theta] (measured in radians) with the circle center — i.e., the central angle — equals [theta] r.
Arc Length Circle Formula: Arc length circle formula in degree:
arc length S = (2r )( 1/360 ) degrees
Where, (theta) is represented by the angle of opposed the arc of circle. = 3.142 (approximately). Radius of the circle is denoted by r. Arc length circle formula in radians:
Arc length S = r (theta) radians
circle radius is denoted by r, and is represented by origin angle of the circle.
90 Degree angle is said to be the angle between two straight lines which are perpendicular to each other. The sum of two angles which is equal to 90 degree, then the angles are called complementary angle. The 90 degree angle is denoted as the symbol ‘’ ∟’’. Thus the angle between two straight horizontal line and vertical line is 90 degree. In this article, we study about how to draw 90 degree angle.
Study Procedure for 90 degree angle: Step 1: Make a reference line as AB with X unit length. Step 2: Place the compass tip at point A and draw arc on both upper and lower side by taking half of the length of AB. Step 3: Similarly draw arc on both upper and lower side at the center of the point ‘’B’’, with same width of the compass. Step 4: The intersecting point of above and below of the line AB is ‘’C’’ and ‘’D’’. Step 5: Join the intersecting point ‘’C’’ and “D”. Step 6: Now we see the line CD and AB is perpendicular each other, we get 90 degree angle. Step 7: The angle COB = 90 degree and the angle COA = 90 degree. Step 8: To joining the point C and the point B, we get hypotenuse and OB is called as adjacent and OC is opposite.
When two lines intersect they form four angles, the opposite angles are equal. Same as when two lines intersect perpendicularly then all the four angles are 90 degree. The distance between the two lines are equal and they will never intersect, such lines are said to parallel lines. When a line cuts two parallel lines, it will form eight types of angles.
Intersecting Lines Angles
Angles of two lines intersection: Angles that have a common vertex and whose sides are formed by the same lines. The following (angle 1 and angle 2) are vertical angles.
let us learn about 
