For positive numbers
8,6,4,2
The largest possible values for the integers are 47, 49, and 51.
66
Solving for an inequality requires an additional step. First you solve as if for an equation, then you need to find which numbers give greater than and less than. The easy way to do this is to put in 0 for the variable and see where the values go greater or less. Example: What is the inequality table for 5x=20? when x=4 the equation balances. if x=0 then the left side is less than 20, so all numbers from 4 towards 0 are going to give "less than" values, so all numbers less than 4. The table is {x|(-∞,4),4,(4,∞)}■
All numbers between -2.5 and 3, not including -2.5.
3Y - 2 = X + 5 This presumes "a number" and "x" are two separate values. If they are the same number, the equation would be 3X - 2 = X + 5. In this equation, X = 3.5.
The largest possible values for the integers are 47, 49, and 51.
66
from the equation using the formula -b/2a to find x value. from there substitute values of x before and after in equation.for example if x is 2 use other x values as 1 and 3.
6, 5, 4
Translate this phrase into an algebraic equation The product of two consecutive multiple of three integers?
Solving for an inequality requires an additional step. First you solve as if for an equation, then you need to find which numbers give greater than and less than. The easy way to do this is to put in 0 for the variable and see where the values go greater or less. Example: What is the inequality table for 5x=20? when x=4 the equation balances. if x=0 then the left side is less than 20, so all numbers from 4 towards 0 are going to give "less than" values, so all numbers less than 4. The table is {x|(-∞,4),4,(4,∞)}■
0 1 2 3 4
Values of pH under 0 and over 14 are possible.
All numbers between -2.5 and 3, not including -2.5.
3Y - 2 = X + 5 This presumes "a number" and "x" are two separate values. If they are the same number, the equation would be 3X - 2 = X + 5. In this equation, X = 3.5.
-1 < x < 64, but if x is less than 0 then x can be any value.
5.43 can be either greater or less than 5.432, because 5.43 is a shorthand representation of any number between 5.425 and 5.434999999999999.... and 5.432 is a shorthand representation of any numbers between 5.4315 and 5.43249999..... The range of possible values of 5.43 overlaps the range of possible values of 5.432 on both ends.