Anamika Mittal
Vellore Institute of Technology (VIT), Bhopal
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Mona Gladys
St Joseph's College (St Joseph's College), Bengaluru
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11 Other formulas that you can solve using the same Inputs

Percentage Increase in number
Percentage Increase in number=((Number B-Number A)/Number A)*100 GO
Percentage Decrease in number
Percentage Decrease in Number=((Number A-Number B)/Number A)*100 GO
Thin-film constructive interference in reflected light
Constructive Interference=(Number A+1/2)*Wavelength GO
C is what percent of A
C is what percent of A=(Number C*100)/Number A GO
What is A Percent of B?
A Percent of B=(Number A*Number B)/100 GO
Rule Of Three
Number D=(Number B*Number C)/Number A GO
Slope Of Line
Slope of Line=(y2-y1)/(x4-x3) GO
Multiplication Of two numbers
Number C=Number A*Number B GO
Subtraction Of two number
Number C=Number A-Number B GO
Addition Of Two Numbers
Number C=Number A+Number B GO
Division Of two numbers
Number C=Number A/Number B GO

Finding S1 to help find location of a point w.r.t. a parabola y^2=4ax Formula

value_at_(x1,y1)=(y1^2)-(4*Number A*x1)
S<sub>1</sub>=(y1^2)-(4*No. A*x1)
More formulas
Length of latus rectum of parabola GO
Slope of normal at (x1, y1) to parabola y^2=4ax GO
slope of tangent at (x1,y1) to parabola y^2=4ax GO
Slope of tangent of parabola when slope of normal is given GO
Slope of normal of parabola when slope of tangent is given GO
Length of the chord intercepted by the parabola y^2=4ax on the line y = mx + c GO
length of the latusrectum if length of the focal segments are given GO
tan of angle θ between tangents at two points on the parabola y2 = 4ax GO
Diameter bisecting chords of slope m to the parabola y2 = 4ax GO
Product of ordinates of 2 points,If normal at 2 point intersect at a 3rd point on y2 = 4ax GO
Distance from the vertex to the focus of parabola GO
y coordinate of focus of parabola with its vertex at ( h, k) opening vertically GO
x coordinate of focus of parabola with its vertex at ( h, k) opening vertically GO
Directrix of parabola with its vertex at ( h, k) opening vertically GO
axis of symmetry of parabola with its vertex at ( h, k), opening vertically GO
x coordinate of focus of parabola with its vertex at ( h, k) opening horizontally GO
y coordinate of focus of parabola with its vertex at ( h, k) opening horizontally GO
Directrix of parabola with its vertex at ( h, k) opening horizontally GO
axis of symmetry of parabola with its vertex at ( h, k), opening horizontally GO
slope 1 of parabola given fixed point(P,Q) and tangent (y-P)=m(x-Q) GO
slope 2 of parabola given fixed point(P,Q) and tangent (y-P)=n(x-Q) GO
Distance between the directrix and vertex for parabola y2 = 4ax GO
Distance between directrix and latus rectum for parabola y2 = 4ax GO
y coordinate of Extremities of latusractum for parabola y2 = 4ax GO
x coordinate of Extremities of latusractum for parabola y2 = 4ax GO
x coordinate of Extremities of latusractum for parabola x2 = -4ay GO
x coordinate of Extremities of latusractum for parabola x2 =4ay GO
x coordinate of Extremities of latusractum for parabola y2 =-4ax GO
y coordinate of Extremities of latusractum for parabola x2 = -4ay GO
y coordinate of Extremities of latusractum for parabola x2 =4ay GO
y coordinate of Extremities of latusractum for parabola y2 =-4ax GO
x coordinate of Point of tangency of parabola GO
y coordinate of Point of tangency of parabola GO
Focal distance of parabola if length of latusractum is given GO
focal distance of parabola if distance between directrix and latus rectum GO
slope of parabola given diameter and x coordinate of focus of parabola GO

What is the standard equation of parabola?

The simplest equation of a parabola is y2 = x when the directrix is parallel to the y-axis. In general, if the directrix is parallel to the y-axis in the standard equation of a parabola is given as: y2 = 4ax If the parabola is sideways i.e., the directrix is parallel to x-axis, the standard equation of a parabola becomes,x2 = 4ay Apart from these two, the equation of a parabola can also be y2 = 4ax and x2 = 4ay if the parabola is in the negative quadrants.

How to Calculate Finding S1 to help find location of a point w.r.t. a parabola y^2=4ax?

Finding S1 to help find location of a point w.r.t. a parabola y^2=4ax calculator uses value_at_(x1,y1)=(y1^2)-(4*Number A*x1) to calculate the value_at_(x1,y1), The Finding S1 to help find location of a point w.r.t. a parabola y^2=4ax formula is defined as the difference of the square of ordinate and quadruple of the product of a and abcissa. value_at_(x1,y1) and is denoted by S1 symbol.

How to calculate Finding S1 to help find location of a point w.r.t. a parabola y^2=4ax using this online calculator? To use this online calculator for Finding S1 to help find location of a point w.r.t. a parabola y^2=4ax, enter y1 (y1), Number A (No. A) and x1 (x1) and hit the calculate button. Here is how the Finding S1 to help find location of a point w.r.t. a parabola y^2=4ax calculation can be explained with given input values -> 25 = (5^2)-(4*2*(0)).

FAQ

What is Finding S1 to help find location of a point w.r.t. a parabola y^2=4ax?
The Finding S1 to help find location of a point w.r.t. a parabola y^2=4ax formula is defined as the difference of the square of ordinate and quadruple of the product of a and abcissa and is represented as S1=(y1^2)-(4*No. A*x1) or value_at_(x1,y1)=(y1^2)-(4*Number A*x1). y1 is the Y co-ordinate of a point on a line, Number A is a number and x1 is the x-coordinate/abscissa of the first point.
How to calculate Finding S1 to help find location of a point w.r.t. a parabola y^2=4ax?
The Finding S1 to help find location of a point w.r.t. a parabola y^2=4ax formula is defined as the difference of the square of ordinate and quadruple of the product of a and abcissa is calculated using value_at_(x1,y1)=(y1^2)-(4*Number A*x1). To calculate Finding S1 to help find location of a point w.r.t. a parabola y^2=4ax, you need y1 (y1), Number A (No. A) and x1 (x1). With our tool, you need to enter the respective value for y1, Number A and x1 and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
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