Monday, 26 October 2015

2 DIGIT EASY MULTIPLY

EASY MULTIPICATION

This about multiplication of  (2 digit)x(2 digit). This will make you to multiply number fastly.




1st step
This is multiplying the right end digit.
If the product is single digit directly take the number to right most one(one’s place) of the result.
If it is double digit, take the one’s place to the one’s place of the result and ten’s place digit keep it in reserve.
2nd step
Multiply  the cross digit both and add them.
If there is any reserve number in 1st step add that number also.
After going through this process the one’s digit obtained in the 2nd step is the ten’s digit of the result.
And keep the ten’s digit of 2nd step multiplication in reserve.
3rd step
Now this is the last step and multiply the left most digits (ten’s digits of given numbers) and add if any reserve number from 2nd step.



Saturday, 17 October 2015

MOD (| |) ------------ curves

HOW  DO  MODULUS EFFECT THE CURVES?? (y=f(|x|),y=|f(x)|….)
WHAT DOES MODULUS DO FIRST?
Simply it changes some quantity  positive or gives absolute value.
Here lets ‘x’ be some real number
|x|=    1. x , where x = positive real number.
             2. –x, where x = negative real number.  

  Now,
Lets us take a curve y=f(x),
Firstly you have to know how to draw the y=f(x) curve.
To draw the curve y=f(|x|),
draw
Y=f(|x|)        1. Y=f(x), for x=+ve values.
                      2.y=f(-x),for x=-ve values.
To draw the curve y=|f(x)|
Draw
Y=|f(x)|          1.y=f(x) , for f(x)=+ve values.
                         2. y=-f(x), for f(x)=-ve values.

Examples

Now  we will take the curve y=sin(x).
Sketch the graph of y=sin(x)


Now lets draw the curve y=-sin(x) and the graph of y=sin(-x) will be same because sin(-x)=-sin(x)


By now we are ready to draw the curves y=f(|x|),y=|f(x)|.
1.Y=f(|x|)  i.e y=sin(|x|)

    Draw 1.sin(x) for x = positive
               2.  sin(-x)=-sin(x) for x=negative     


2.y=|f(x)|  i.e y=|sin(x)|
Draw 1.sin(x) for sin(x)=positive (y=positive)

           2.-sin(x) for sin(x)=negative(y=negative)




Thursday, 15 October 2015

CHECKING SYMMETIC NATURE OF CURVES

Symmetric nature of curves
Here what does actually symmetric nature mean?
Symmetric nature of the curve mean that it is reflection or
Image  or replica of the curve about some line or point.
Here “about some line or point” usually we consider line x-axis(y=0) or y-axis (x=0)  and the point is origin(0,0)
Now  how to find a curve is symmetric about a some point
1.symmetric about origin
 we replace the y with –y  and the x with –x ,if the equation the curve doesn’t change then the curve is said to be symmetric about origin.
Example: line y=x,y=x3,y=x2n+1where n is natural number N, etc..
Lets now check y=x3  holds this property good
Given equation y=x3
Replace by y by –y and x by –x, then the equation will become
(-y)=(-x)3
-y=-x3
Y=x3    hence the equation is symmetric about origin.
2.symmtric about some other point(x,y)
How to check the symmetric nature ?
First take the point(x,y) which is told curve is symmetric about
And choose any point which is on the curve and find the image of the point on the curve about (x,y)
If the image point lies on the curve , the curve is said to be symmetric about point(x,y) only when all points on the curve satisfies this property.
Symmetric nature about a line

1.     about  x-axis(y=0)

 we replace y by-y, if there is no change in the equation of cuvre

2.about y-axis(x=0)

We replace the xby –x, if there is no change in the equation .

3.about some other line

For all points on the curve if we find out the image about given line all the images of those points lies on curve .

For checking symmetric take some point on curve and check it out. 

SHIFTING CURVES

SHIFTING OF CURVE
The graph of the curve is  normally shifting of curve is adding a constant value to a standard curves like  y=x, y=X2,y=sin(x) etc..
Lets take a function f(x)=y and the constant be some ‘k’.
1.   If we add k to ‘x’ i.e y=f(x+k),then the curve will be shifted k units towards left.
2.   If we subtract k to ‘x’ i.e y=f(x-k),then the curve will be shifted k units towards right.
3.   If we add k to ‘y’ i.e (y+k)=f(x),then the curve will be shifted k units towards down.
4.   If we subtract k to ‘y’ i.e (y-k)=f(x),then the curve will be shifted k units towards up.
For example lets take a curve y=|x|
The graph of the curve is
For the 1st one i.e f(x+k) 

For the 2nd one i.e f(x-k)
 For the 3rd one i.e (y+k)=f(x) 
 For the 4th one i.e (y-k)=f(x) 
Same thing can be done for shifting of any curve.

Monday, 12 October 2015

congurent triangles

what does congurent mean in triangles?

two triangles are said to be congurent means that the  the dimensions(sides) and the angles are equal respectivelyWP_20151011_001[1]
# actually  there are 6 dimensions i.e 3 sides and 3 angles for a triangle.
# if all the dimensions are same for both the triangle they are said to be congurent.
# it is difficult for us to check all the dimensions to conform the congurence
# so there are few property from which we can easily find out the congurence of the tirngles
#there are 4 types congurence properties through which we can find congurency
1) side-side-side(sss)
2)angle-side-angle(asa)
3)side-angle-side(sas)
4)right angle-hypotense-side
1.SSS property
if sides of the one triangle are equal to sides of the other triangle . both the the triangles are said to be congurent under sss property
WP_20151011_003[1]
2.ASA property
if any two angles of the triangle and the included side of both the triangles are equal . the two triangles are similar under asa property
.WP_20151011_005[1]
included side: the side in between the two angles is included side
3. SAS property
if the two side and the included angle of both the triangles are equal they are under sas property
include angle: the angle between two sides
WP_20151011_006[1]
4.RHS property
this property is for the right angled(90 degrees) triangle only
if both the triangles have same length of hypotense and any side they are said to be congurent under RHS property
WP_20151011_008[1]