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Its like the quote "which came first? The chicken or the egg?" But in Descartes case, God. He clearly and distinctly knows that he himself is a thinking being, but he just assumes that he clearly and distinctly has knowledge of a God." You need coffee in the morning to get out of bed, but you also need to get out of bed to make the coffee." God created us, perfect beings, but then did we create God? In our thoughts is where God exists. There is no sensory proof of it, just our minds that lead us to believe so.
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What is the formular for a circle?
In Cartesian coordinates:(x - a)2 + (y - b)2 = R2(a, b) is the center-point of the circleR is the circle's radius.
Give me 2 examples of problems that can be solve through cartesian coordinate system?
1.Finding the solution to a system of linear equations can be found using cartesian coordinates. 2. Graph a circle and you can find the radius using cartesian coordinates.
Find the center of a circle with the equation x2 plus y2-18x-14y plus 124?
The center of the circle is at (9, 7) on the Cartesian plane
What is the centre and radius of a circle passing through the points of 5 5 and 8 5 and 5 1 on the Cartesian plane?
Using the formula of x^2 +2gx +y^2 +2fy +c = 0 it works out that the centre of the circle is at (6.5, 3) and its radius is 2.5 units in length. Alternatively plot the points on the Cartesian plane to find the centre and radius of the circle.
Is a cartesian plane the same as a cartesian coordinate?
The cartesian coordinates are plotted on the cartesian plane
What is the centre and radius of a circle enscribed through the points of 6 2 and 8 -2 and 0 2 on the Cartesian plane?
It works out that the circle's centre is at (3, -2) and its radius is 5 on the Cartesian plane.
What is the Cartesian equation of a circle whose centre is in the 1st quadrant with a radius of 7 and touches the x and y axes?
Centre of the circle is at (7, 7) and its Cartesian equation is (x-7)^2 + (y-7)^2 = 49
What is the formular for a circle?
In Cartesian coordinates:(x - a)2 + (y - b)2 = R2(a, b) is the center-point of the circleR is the circle's radius.
Give me 2 examples of problems that can be solve through cartesian coordinate system?
1.Finding the solution to a system of linear equations can be found using cartesian coordinates. 2. Graph a circle and you can find the radius using cartesian coordinates.
Find the center of a circle with the equation x2 plus y2-18x-14y plus 124?
The center of the circle is at (9, 7) on the Cartesian plane
What is the equation of a circle with center (3 8) and a radius of 2?
Centre of the circle: (3, 8) Radius of the circle: 2 Cartesian equation of the circle: (x-3)^2 + (y-8)^2 = 4
Disadvantages of drawing a circle using polar coordinates method?
Polar Co-ordinates are non-Cartesian co-ordinates. Since most of the Graphics Package do not support non-Cartesian co-ordinates,Polar co-ordinates should be converted to Cartesian form.
What is the formula for circle?
Formula of a circle in a Cartesian plane: (x-h)^2+ (y-k)^2 = r^2 where the center is at (h,k) and the radius is r.
What is the centre and radius of a circle passing through the points of 5 5 and 8 5 and 5 1 on the Cartesian plane?
Using the formula of x^2 +2gx +y^2 +2fy +c = 0 it works out that the centre of the circle is at (6.5, 3) and its radius is 2.5 units in length. Alternatively plot the points on the Cartesian plane to find the centre and radius of the circle.
Is a cartesian plane the same as a cartesian coordinate?
The cartesian coordinates are plotted on the cartesian plane
How are circle graphs and line graphs similar?
They are two dimensional plots in which the coordinates of a simple geometric shape are expressed in the Cartesian plane.
What is the formula for a circle?
Formula of a circle in a Cartesian plane: (x-h)^2+ (y-k)^2 = r^2 where the center is at (h,k) and the radius is r.
