If the substitute for good Y increases in popularity, it is likely that fewer people will buy good Y and instead opt for the substitute. This could lead to a decrease in demand for good Y and potentially lower prices for that good. Additionally, producers of good Y may need to adjust their production and marketing strategies to remain competitive in the market.
Two quantities are directly proportional if they increase or decrease at a constant rate or ratio. This means that as one quantity increases, the other also increases, and vice versa. Mathematically, this relationship is expressed as y = kx, where y is directly proportional to x, and k is the constant of proportionality.
When two variables are directly proportional, it means that as one variable increases, the other variable also increases at a constant rate. In mathematical terms, this relationship can be expressed as y = kx, where y is one variable, x is the other variable, and k is a constant value.
If quantity A is directly proportional to another quantity B, it means that if B is doubled so is A. When B is tripled so is A. It also works in the other direction; if A is tripled so is B. It works for any factor. In mathematical terms one may write: A = C * B Where C is some numerical constant.
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Using sonar without "r" and "l" can be challenging, but you can try to substitute similar sounds like "w" for "r" and "y" for "l." Alternatively, you can rephrase your sentence to convey your message without using those specific sounds.
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Say there are two goods..x and y, which can be substituted with each other..now if the price of good x increases..the consumer will buy less of good x and more of goods y. Since goods x and y are substitute goods..so change in price of goods x will change the demand of good y..so price effect of substitute goods is positive.
As x increases, the behavior of y depends on the specific relationship between the two variables. If y is directly proportional to x, then y will increase as x increases. Conversely, if y is inversely proportional to x, then y will decrease as x increases. In cases of more complex relationships, the impact on y could vary depending on the nature of the function or equation that describes their relationship.
When x is nearly zero,y increases in value.
as the y-intercept increases, the graph of the line shifts up. as the y-intercept decreases, the graph of the line shifts down.
The value of x is directly proportional to to the value of y.hence when the value of x increases the value of y decrteses and vice verse
If the slope is negative, y decreases as x increases. The slope goes from top-left of the graph (Quadrant II) to the lower-right of the graph (Quadrant IV).
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substitute 0 for y and solve for x. then substitute x for 0 and solve for why and you have the x and y coordinates
y=x+2, as x increases, y increases
To put in something that represents something else.Ex: x=2 y=9Ex: x + y* You would substitute x with 2 and y with 9.
x-intercept: 1. substitute 0 for y 2. solve for x y-intercept: 1. substitute 0 for x 2. solve for y