acute
obtuse
right
None of the above
Answer:
acute
Step-by-step explanation:
obtuse is over 90°
acute I less that 90°
and right is exactly 90°
Answer:
D
Step-by-step explanation:
y = -2/5x+4
Hope I helped all you have to do is subsitute the values for m and b!
Answer:
y = -2
Step-by-step explanation:
You would use the Point-SlopeFormulasince we are given a point:
y - y₁ = m(x - x₁)
y + 2 = 0
y = -2
Because there was no rateofchange[slope] given, it was automatically assumed to be a zero slope, which is a horizontal line.
I am joyous to assist you anytime.
2. Predict how much water will be in the bucket after 14 hours if Franklin doesn't stop the leak.
The relationship between the number of hours and the amount of water in the bucket can be represented by the equation y = 8x. After substituting 14 for 'x' in the equation, we find that there will be 112 ounces of water in the bucket after 14 hours.
The relationship between the number of hours and the amount of water in the bucket can be represented by a linear equation. Let's call the number of hours 'x' and the amount of water in the bucket 'y'. We can use the data in the table to find the equation.
From the data, we can see that the amount of water in the bucket increases by 8 ounces every hour. So, the equation for the relationship is y = 8x.
To predict how much water will be in the bucket after 14 hours, we can substitute 14 for 'x' in the equation and solve for 'y'. Substituting the values, we get y = 8 × 14 = 112 ounces. Therefore, if Franklin doesn't stop the leak, there will be 112 ounces of water in the bucket after 14 hours.
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The question pertains to a mathematical concept of linear equations and prediction. Based on the rate of water leakage given in a data table, a linear equation can be formed: y = r*x, where r is rate and x is time. Substituting 14 for x would allow for a prediction of water collected after 14 hours.
The subject of the question is Mathematics, particularly dealing with linear equations and predictions which is generally taught in Middle School. The problem provided seems to be an example of a linear relationship, meaning the amount of water in the bucket increases at a constant rate over time. However, without access to the data table mentioned, we can't directly determine the specific relationship or make a precise prediction.
Assuming that you have data in the form of ‘hours passed’ and ‘quantity of water in the bucket’ we can use this information to create a linear equation. Let’s say, for instance, the constant rate is r gallons per hour. This would make the equation y = r * x, where y is the total amount of water and x is the time passed.
To predict how much water will be in the bucket after 14 hours, simply substitute 14 into the equation for x. Again, assuming a rate of r, this would be y = r * 14. Without the specific values from the table, this is as accurate a prediction as possible.
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i think its wait actully nvm