If you are supposed to take pills at half-hour intervals, how many minutes would 5 pills last? A) 120 minutes B) 125 minutes C) 130 minutes D) 135 minutes

Answers

Answer 1

Answer:

Answer: B) 125

Step-by-step explanation:

Related Questions

An angle measuring (525n)° is in standard position. For which value of n will the terminal side fall along the negative portion of the y-axis?A) n = 2 B) n = 3 C) n = 5 D) n = 6
0.34 and 3/4 are equivalent. True False
Which geometric solid is the best model for the nose of a human being?A. Rectangular prism B. Cylinder C. Sphere D. Pyramid
List the intervals on which f is increasing.
Leslie currently spends $20 to have her yard raked each fall. Leslie is considering buying a leaf blower for $70. The model she is considering usually lasts four years. What is the total monetary cost or benefit of buying the leaf blower?

Tian makes his own pizza dough. he uses 2 packages of yeast for every 5 cups of flour. if he needs 15 cups of flour to make enough pizza for his family, how many packages of yeast does he need?

Answers

Answer:

Step-by-step explanation:

15 x 2/5

Then cross factor

Exercise 6: The daily cost of renting a car is $35 plus $0.50 per mile traveled. If Glendola paid$160.00 for a day's rental, how many miles did she travel?

Answers

Answer:

Glen travled 250 miles

Step-by-step explanation:

subtract 35 from 160 because that is the up front payment and then divide that answer by .50

Graph 4x^2 + y^2 = 9. What are its lines of symmetry?

Answers

4 x² + y² = 9 / : 9
x² / (9/4) + y² / 9 = 1
This is an ellipse. Equation is: x²/a² + y²/b² = 1
a² = 9/4 ⇒ a = 3/2
b² = 9 ⇒ b = 3
The axis of symmetry are the x and y axis, or the lines: y = 0 and x = 0.
Graph is in the attachment.

The lines of symmetry for the graph of equation 4x² + y² = 9 are the x-axis and the y-axis.

To determine the lines of symmetry of the graph of equation 4x² + y² = 9, we need to analyze the form of the equation.

The given equation represents an ellipse, as it contains terms for both x² and y².

Comparing this with the given equation 4x² + y² = 9, we can rewrite it as:

(2x)²/3² + y²/3² = 1

By comparing the equations, we can deduce that a² = 3² and b² = 3². This means that the major axis has a length of 2a = 2(3) = 6 and the minor axis has a length of 2b = 2(3) = 6.

Since the ellipse is symmetric with respect to both the x-axis and the y-axis, there are two lines of symmetry.

Learn more about ellipses here:

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Identify the domain and range
with steps please (picture below)

Answers

$D:x-1\geq0\n D:x\geq1\n\n$

$\hbox{ range of } \sqrt {x-1} \hbox{ is } \langle0,\infty)\n \hbox{ range of } -(3)/(4)\sqrt {x-1} \hbox{ is } \langle-(3)/(4)\cdot0,-(3)/(4)\cdot\infty)=(-\infty,0\rangle\n \hbox{ range of } -(3)/(4)\sqrt {x-1}+4 \hbox{ is } (-\infty+4,0+4\rangle=(-\infty,4\rangle\n$

Which is a feature of a Roth IRA?You must pay tax if you withdraw your earnings once you're 59.5 years old.
You can withdraw your earnings once you're 59.5 years old but must pay a penalty.
You can withdraw your earnings once you're 59.5 years old without paying a penalty.

Answers

The correct answer is:

You can withdraw your earnings once you're 59.5 years old without paying a penalty.

Explanation:

As long as you have had the Roth account for at least 5 years, you may withdraw your money at age 59.5 penalty free.

If you are not 59.5, you must meet other specific criteria, such as using the money to purchase a home, or leave it in your estate.

The right answer for the question that is being asked and shown above is that: "You can withdraw your earnings once you're 59.5 years old without paying a penalty." a feature of a Roth IRA is that You can withdraw your earnings once you're 59.5 years old without paying a penalty.

Which equation has the same soultions as x^2+6×-7=0

Answers

$x^2+6x-7=0 \n a=1 \n b= 6 \n c=-7 \n \n \boxed{\boxed{\Delta=b^2-4ac}} \n \n \Delta=6^2-4*1*(-7) \n \Delta=36-(-28) \n \Delta=64 \n \Delta\ \textgreater \ 0 \Rightarrow \text{we have 2 solutions :} X_1 \ and X_2 \n \n \boxed{X_1= (-b- √(\Delta) )/(2a) } \Rightarrow X_1= (-6-8)/(2)=-7 \n \n \boxed{X_2= (-b+ √(\Delta) )/(2a) } \Rightarrow X_2= (-6+8)/(2) =1$

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