What is the square root of .16
Answers
Step-by-step explanation:
umm I think it's my dude .4
Related Questions
Which of the following is an identity? A. secx tanx - cosx cotx = sinx B. (tanx + cotx)(sinx cosx) = 1 C. sin2x = 4 - 2cos2x D. cosx(2sinx + 1) = 0
9. Identify the number of solutions to 3x + 21 = 3(x+ 7).
This is for algebra 1
ASAP!!! if my grade is a 91% and i get a 74% what will my grade be
Answers
2y=6+4x
we can isolate the y in the second function
2y=6+4x
/2 /2
y=3+2x
then change all the y to 3+2x in first function
4x+3(3+2x)=14
4x+9+6x=14
10x=5
/10 /10
x=0.5 or 1/2
then fill the x in the function, get y.(each function will work)
2y=6+4x
2y=6+4(1/2)
2y=6+2
2y=8
y=4
x=0.5 y=4
Answers
Full question attached
Answer and explanation:
Since x = number of true or false questions correct
And y = number of multiple choice questions correct
And each question for x =2 points
each question for y=3 points
since she then needs a total score of more than 93 to pass, we add up total correct questions and
Inequality equation = 2x +3y >93
Final answer:
To find the least number of points for which the number of points for Part A is equal to the number of points for Part B, we need to find the least common multiple (LCM) of the values of points for true/false questions and multiple choice questions.
Explanation:
To find the least number of points for which the number of points for Part A is equal to the number of points for Part B, we need to find a common multiple of the values of points for true/false questions and multiple choice questions. Let's assume the number of points for true/false questions is x and the number of points for multiple choice questions is y. We need to find the least common multiple (LCM) of x and y. Once we find the LCM, that will be the minimum number of points for which the number of points in Part A is equal to the number of points in Part B.
For example, if the number of points for true/false questions is 4 and the number of points for multiple choice questions is 6, we can find the LCM as follows:
- List the multiples of 4: 4, 8, 12, 16, 20, 24, ...
- List the multiples of 6: 6, 12, 18, 24, 30, ...
- Find the smallest number that appears in both lists: 12
Therefore, the least number of points for which the number of points in Part A is equal to the number of points in Part B is 12.
Learn more about Least Common Multiple (LCM) here:
#SPJ3
Answers
2 (22 + 68.8) = 2 (90.8) = 181.6
a) function is positive on (-∞,-5)
b) fuction is negative on (-5,3)
c) function is positive on (-∞,1)
d) function is negative on (3,∞)
Answers
Answer:
d) function is negative on (3,∞)
Step-by-step explanation:
The even degree and negative leading coefficient tell you that the function is negative as x ⇒ ±∞. (Selections A and C cannot be correct.)
The odd multiplicity tells you the function crosses the x-axis at x=-5 and x=3, so will be non-negative between those values. (Selection B cannot be correct.)
The function is negative on (3, ∞).
Answer:
The graph of the function is positive on (-co, -5).
The graph of the function is negative on (3,co).
Step-by-step explanation:
We know that the roots are in: -5, 1 and 3.
and after 3, the graph is in the negative side, so between 1 and 3 the graph must be in the positive side, between -5 and 1 the graph must be in the negative side, and between -inifinity and -5 the graph must be in the positive side:
So the statements that are true are:
The graph of the function is positive on (-co, -5).
The graph of the function is negative on (3,co).
Answers
Answer:
The answer is 40. The answer to the question provided is letter b.
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Step-by-step explanation:
☆Solve using the pythagorean theorem.
Answers
t - the cost of one cup of tea
1. (4c + 3t=6.95)*2 -----> 8c+6t=13.90 (1)
(5c + 2t =7.20) *(-3) ---->-15c-6t=-21.60 (2)
2. Add equation (1) and (2)
-7c= - 7.70, c=1.10 Cup of Coffee £ 1.10
3. substitute 1.10 into the first equation
4c + 3t=6.95, 4*1.10 + 3t=6.95, 3t = 6.95-4.40 =2.55, t= £ 0.85 cup of tea