X = 0
[ Y = 1/2 x - 2 ]
Y axis is usually the vertical one and x is the horizontal one.
Well, since a tangent line touches a line in one spot, the Y axis could be considered tangent to the X axis.
Provide a system of equations in slope-intercept form that has one solution. Using complete sentences, explain why this system has one solution.
axes
The darker horizontal line on a graph. It represents the x-values. The lighter vertical line is the y axis. It represents the y-values.
Normally, the y axis on on a graph is the one that goes vertically. It usually used to represent the output of a function, where the x axis (the horizontal one) represents the input.
Ontario Quebec Nova Scotia New Brunswick This sequence represents the correct chronological order in which the provinces joined the Canadian Confederation. Ontario and Quebec joined in 1867, while Nova Scotia and New Brunswick joined shortly after in the same year.
The x axis is the horizontal (flat, bottom, left-right) axis generally, though sometimes they are manipulated to make math easier. -the x axis sometimes represents time The y axis is the vertical (up-down) one.
It is one of two variables, conventionally plotted on the vertical axis in the coordinate plane.
In the sentence "Which one of the following words represents an object of a preposition?", "Of the following words" and "Of a preposition" are prepositions. The object of a prepositon in each would be "words" and "prepositions".
The horizontal number line. The one you goofed around with in basic arithmatic.
The answer is given in the following sentence.
The analytical method involves simultaneous equations but if you do not know that, draw graphs of the equations: with one variable represented per axis. The solution, if any, is where the graphs meet.
PV=nRT apex :)
The geometry for SF6 is octahedral, with a central sulfur atom surrounded by 6 equidistant fluorine atoms situated in the following way: One on the positive x-axis, one on the negative x-axis, one on the positive y-axis, one on the negative y-axis, one on the positive z-axis, and one on the negative z-axis.
If for every point on the horizontal axis, the graph has one and only one point corresponding to the vertical axis; then it represents a function. Functions can not have discontinuities along the horizontal axis. Functions must return unambiguous deterministic results.