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What values would satisfy x factorial equals y squared?
For any integer value of x ≥ 0, there are two values, ±y, such that x! = y2. For example, if x = 3 then x! = 6 and so y = ±√6
What values of x satisfy the equation x2-x equals 6?
-4
When k is Eliminated in the system 5j-k equals 17j plus 3k equals 3 what values of j and k will satisfy the system?
j=-3 and k=2
What plus what divided by 5 equals 5?
Any two values which total 25
3x - 4y equals -11?
Wonderful. Thanks for sharing. If we had another equation in addition to that one, then we could find unique values for 'x' and 'y' that satisfy both. With only this equation, there are an infinite number of pairs of values that satisfy it, just as long as y = 0.75x + 2.75 .
What values would satisfy x factorial equals y squared?
For any integer value of x ≥ 0, there are two values, ±y, such that x! = y2. For example, if x = 3 then x! = 6 and so y = ±√6
What values of x satisfy the equation x2-x equals 6?
-4
How many different combinations of x-values and y-values could satisfy the equation - x plus y equals 5?
10.
What is the formula for finding time if you have speed and distance values?
Speed equals distance divided by time. By rearranging that formula, we get time equals distance divided by speed.
Which measure of central tendency equals the sum of the data values in a set divided by the number of data values?
mean
When k is Eliminated in the system 5j-k equals 17j plus 3k equals 3 what values of j and k will satisfy the system?
j=-3 and k=2
What plus what divided by 5 equals 5?
Any two values which total 25
3x - 4y equals -11?
Wonderful. Thanks for sharing. If we had another equation in addition to that one, then we could find unique values for 'x' and 'y' that satisfy both. With only this equation, there are an infinite number of pairs of values that satisfy it, just as long as y = 0.75x + 2.75 .
What is 3x plus 1.80y equals 36?
It's a single linear equation in two variables. The graph of the equation is a straight line; every point on the line is a set of values that satisfy the equation. In other words, there are an infinite number of pairs of (x,y) values that satisfy it. In order to figure out numerical values for 'x' and 'y', you would need another equation.
What number can 143 and 33 be divided by?
Both 143 and 33 can be divided by 11. The number 11 is a common divisor of these two values, as 143 divided by 11 equals 13, and 33 divided by 11 equals 3. Additionally, the greatest common divisor (GCD) of 143 and 33 is 11.
Which values satisfy the inequality?
To determine which values satisfy a given inequality, you'll need to analyze the inequality itself. Start by isolating the variable on one side, if necessary. Then, test values within the solution interval or use a sign chart to identify the ranges that meet the inequality's condition. If you provide the specific inequality, I can help identify the exact values that satisfy it.
Is there any number that equals 21 and 34?
No, there is no single number that equals both 21 and 34, as they are distinct values. A number can only be equal to one specific value at a time. Therefore, no number can satisfy the condition of being equal to both 21 and 34 simultaneously.
