Answer: Your Answer Is 1/5 OR 0.2 (BOTH ARE CORRECT) (:
Step-by-step explanation:
(1/3) (3/5) =
1 3 / 3 5 =
3/15 =
1/5 OR 0.2 Hope I Helped!!! (:
Answer:
Step-by-step explanation:
Answer:
1
Step-by-step explanation:
Answer:
Graph the points, first number along x-axis & second number along the y- axis.
Answer: First number along x-axis & Second number along the y- axis.
Step-by-step explanation:
Complete the sentence below. Choose the correct answer from the drop down menu.
The relationship between degrees Celsius and degrees Fahrenheit
.
Explain or show your reasoning.
Type your response or use the drawing space below.
The relationship between degrees Celsius and degrees Fahrenheit, as given by the equation F = 95C + 32, is not proportional.
The relationship between degrees Celsius and degrees Fahrenheit is not a proportional relationship.
In a proportional relationship, the ratio between the two variables remains constant. However, in the equation F = 95C + 32, the relationship between Celsius and Fahrenheit is not proportional because the coefficient of C is 95, indicating that the conversion between the two scales is not a simple multiplication or division by a constant value.
To illustrate this, consider two examples:
If we double the value of C, the equation becomes F = 95(2C) + 32 = 190C + 32. The coefficient of C changes, indicating that the relationship is not proportional.
If we set C = 0, the equation becomes F = 95(0) + 32 = 32. This shows that at 0 degrees Celsius, the Fahrenheit temperature is not zero, further demonstrating that the relationship is not proportional.
Therefore, the relationship between degrees Celsius and degrees Fahrenheit, as given by the equation F = 95C + 32, is not proportional.
Read on temperature on brainly.com/question/24746268
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Answer:
No, there are no proportional relationships here.
Step-by-step explanation:
I think you mean F=(*C)+32
No, there is not. There is no proportional relationship because proportional relationships require multiplication and division only, not any extra additive numbers, else it would not be proportional. Evidence: If we turned this into a graph, like so: y=(*x)+32, then the slope would not pass through zero.