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What is the relationship between the perimeters of rectangles with the same area?
None, other than that if the area is x square units, the perimeter must be greater than or equal to 4*sqrt(x) units. It is possible to construct a rectangle for each and every one of the infinitely many values greater than 4*sqrt(x) units. Consequently, there can be no relationship as suggested by the question.
What are the similarities between greater than and less than?
The relationship are the opposite of one anther: that is, if X is greater than Y then Y must be less than X.
What is relationship of a triangle between sides?
The relationship between just the sides is that the sum of any two of them must be greater than the third. Any other relationship involves one (or more) angles.
What is the definition of inequality statements?
Inequality statements are mathematical expressions that compare two values or quantities, indicating that one is greater than, less than, greater than or equal to, or less than or equal to the other. They use symbols such as > (greater than), < (less than), ≥ (greater than or equal to), and ≤ (less than or equal to). These statements are fundamental in algebra and help to describe relationships between variables and solve problems involving ranges of values.
What are symbols that evaluate each field value to determine if it is the same or in between a range values as specified by the criteria?
less than (<) and greater than (>)
If l is greater than m and m is greater than n then what is the relationship between the values of l and n?
If l > m and m > n then l > n by the transitive property of inequality.
What is the relationship between the perimeters of rectangles with the same area?
None, other than that if the area is x square units, the perimeter must be greater than or equal to 4*sqrt(x) units. It is possible to construct a rectangle for each and every one of the infinitely many values greater than 4*sqrt(x) units. Consequently, there can be no relationship as suggested by the question.
What are the similarities between greater than and less than?
The relationship are the opposite of one anther: that is, if X is greater than Y then Y must be less than X.
When two expression are compared using greater than and less than the whole statement is an?
When two expressions are compared using greater than (>) and less than (<), the whole statement is called a relational expression or inequality. It indicates the relationship between the two expressions in terms of their values, showing whether one is greater than, less than, or equal to the other. These comparisons are fundamental in mathematics and help in solving equations and inequalities.
What is relationship of a triangle between sides?
The relationship between just the sides is that the sum of any two of them must be greater than the third. Any other relationship involves one (or more) angles.
What is the relationship between the 6 in 546203 and the 6 in 462187?
60000 is ten times greater than 6000
If t less than s and s less than r what is the relationship between the values t and r?
t < r
What is the definition of inequality statements?
Inequality statements are mathematical expressions that compare two values or quantities, indicating that one is greater than, less than, greater than or equal to, or less than or equal to the other. They use symbols such as > (greater than), < (less than), ≥ (greater than or equal to), and ≤ (less than or equal to). These statements are fundamental in algebra and help to describe relationships between variables and solve problems involving ranges of values.
What are symbols that evaluate each field value to determine if it is the same or in between a range values as specified by the criteria?
less than (<) and greater than (>)
Mathematical sentence that compares quantities are called?
Mathematical sentences that compare quantities are called inequalities. These expressions show the relationship between two values using symbols such as > (greater than), < (less than), ≥ (greater than or equal to), and ≤ (less than or equal to). For example, the sentence "5 > 3" indicates that 5 is greater than 3. Inequalities are essential in various fields, including mathematics, economics, and engineering, to express constraints and comparisons.
What do you notice about the relationship between the factors and the product when multiplying two decimals less than 1?
The factors are greater than the product.
Which is greater 0.3 or 0.65?
To determine which is greater between 0.3 and 0.65, we can compare their decimal values. In this case, 0.65 is greater than 0.3 because the digit 6 in the tenths place is greater than the digit 3 in the tenths place. Therefore, 0.65 is greater than 0.3.
