Susan and Kelvin each receive $100
$
100
as a gift.
Part A
Susan buys a movie ticket for $12.50
$
12.50
and 3
3
buckets of popcorn that cost $14.20
$
14.20
each with her $100
$
100
. Which statement is true?
Answer:
c
Step-by-step explanation:
Tony has 3/4 pound of candy. He wants to make small bags that are 1/8 pound each. How many bags can he make? Show all steps.
Answer: 6 bags
Step-by-step explanation:
We will divide the total amount [3/4 pounds] by the amount per bag [1/8 pound] to find how many bags he can make.
After writing the problem, we will use "Keep, change, flip" (Keep the first fraction, change to multiplication, flip the second fraction).
[tex]\displaystyle \frac{3}{4}\ \text{pounds} \div \frac{1}{8} \ \text{pounds}[/tex]
[tex]\displaystyle \frac{3}{4}\ \text{pounds} * \frac{8}{1} \ \text{pounds}[/tex]
[tex]\displaystyle \frac{3*8\ \text{pounds}}{4*1\ \text{pounds}}\[/tex]
[tex]\displaystyle \frac{24}{4}\[/tex]
6 bags
The ratio of boys to girls in Coach Sheppard's class is 3 to 5. There are 20 girls
in the class.
What is the total number of students in Coach Sheppard's class?
Answer:
umm i am pretty sure it is 20 to 22
Step-by-step explanation:
Pls help! Be honest pls be honest......
Answer:
ur x intership is (4) and ur y intership is (1)
Step-by-step explanation: its where the dots are or are u doing an equation?
Point G lies between points F and H on Line segment F H.
A line contains points F, G, H. The space between F and G is 4 x. The space between G and H is 2 x.
If the length of FH is 18 units, what is the value of x?
Answer:
We get the value of x: x = 3
Step-by-step explanation:
Point G lies between points F and H on Line segment F H.
Space between F and G = 4x
Space between G and H = 2x
Length of FH = 18
We need to find value of x.
As point G lies between point F and H, sum of FG and GH will give FH, we can write
[tex]FG + GH = FH[/tex]
Putting values to make equation
[tex]4x + 2x = 18[/tex]
Now, solving the equation we can find value of x
[tex]4x + 2x = 18 \\6x=18\\x=\frac{18}{6}\\x=3[/tex]
So, we get the value of x: x = 3
Answer:
dlfkv
Step-by-step explanation:
What is the range of fx) = 3^x
A. All positive real numbers
B. All real numbers greater than 3
C. All real numbers
D. All real numbers greater than or equal to 3
Answer:
d brainest plz
Step-by-step explanation:
1.1.3 what is a function? Question 5 out of 10 Mark all the statements that are true
A. The domain for this function is the set {-5}
B. The range for this function is the set {-5}
C. All real numbers are in the range of this function
D. The domain for this function is all real numbers
C. This graph is not a function because the value of Y is the same for every value of X
Cristina picked out a new tennis racket that was priced at $35.00. She has saved $40.00 to cover the tax. If there is an 8% tax, then how much will she pay for the tennis racket and the tax
Answer:
37.8
Step-by-step explanation:
Help brainliest for correct answer
Answer:
14 degrees.
Step-by-step explanation:
I am assuming that the 56 degree angle is at the centre of the circle.
The angle at the top in the circle = 1/2 * 56 = 28 degrees.
The reflex angle = 360 - 56 = 304 degrees.
If we draw a line from the vertex of the 56 degrees angle to the vertex of 28 degree angle we bisect the reflex angle and the 28 degree angle. Also the 2 triangles formed are congruent ( by SSS).
So x = 180 - 1/2 * 28 - 1/2 * 304
= 180 - 14 - 152
= 180 - 166
= 14 degrees.
what values of b will cause 4x^2+bx+25=0 to have one real solution?
Answer:
b=20 or b=-20
Step-by-step explanation:
Keep in mind the meanings of the values of the discriminant:
If b^2-4ac=0, then the quadratic will have only 1 solution (double root)
If b^2-4ac<0, then the quadratic will have no real solutions
If b^2-4ac>0, then the quadratic will have 2 unique solutions
In this case, to get one real solution, the discriminant must be set up as b^2-4ac=0. Setting up the equation we get:
b^2-4(4)(25)=0
b^2-400=0
b^2=400
b=20 or b=-20
So the values of b would have to be either 20 or -20
The values of b will cause 4x^2+bx+25=0 to have one real solution is -20 and 20
Given the quadratic equation [tex]4x^2+bx+25= 0[/tex], for this expression to have a real solution, the discriminant must be greater than zero
D > 0
b^2 - 4ac > 0
Given that a = 4, b = b, c = 25
b^2 - 4(4)(25) > 0
b^2 - 400 > 0
b^2 > 400
b > ±20
Hence the values of b will cause 4x^2+bx+25=0 to have one real solution is -20 and 20
Learn more on discriminant here: https://brainly.com/question/24730520
2. If f(x) = 2(x - 3)2 find f(-8).
Answer:
-44
Step-by-step explanation:
please help I'm almost out of time
Answer:
3/2
Step-by-step explanation:
move the 3x to the other side and divide it by 2
8.9 - 1.4x + 6.5x + 3.4
PLEASE HELP
Answer: is 10
Step-by-step explanation:input :
Changes made to your input should not affect the solution:
(1): "3.4" was replaced by "(34/10)". 4 more similar replacement(s)
STEP
1
:
17
Simplify ——
5
Equation at the end of step
1
:
89 14 65 17
((——-(——•x))+(——•x))+——
10 10 10 5
STEP
2
:
13
Simplify ——
2
Equation at the end of step
2
:
89 14 13 17
((——-(——•x))+(——•x))+——
10 10 2 5
STEP
3
:
7
Simplify —
5
What do we use to replace for an unknown number?
A) A variable
B) A number
C) An Operation
D) An equal sign
Answer:
A. A variable
Step-by-step explanation:
What is
32747 written 4
significant figure?
Answer:
words are big and if words are big am I small
What equation makes the line go through the following points.
(11, -3) and (7, 9)
Answer:
y = -3x + 30
Step-by-step explanation:
First, find the slope using the slope formula:
m = (y2 - y1) / (x2 - x1)
m = (9 - (-3)) / (7 - 11)
m = -12/4
m = -3
Next, find the y-intercept by substituding one of the two points into what the equation is so far:
y = -3x + b
(7, 9)
9 = -3(7) + b
9 = -21 + b
30 = b
Now you have the full equation:
y = -3x + 30
if f(x)=x^2+6 and g(x)=-2x, what is the value of f(g(4))-g(f(4))
Solve for r: -6+4r=2(r-4)
A) -1
B) 1
C) -12
D) 12
Answer:
r = -1
Step-by-step explanation:
-6 + 4r = 2(r - 4)
-6 + 4r = 2r - 8
+6 +6
4r = 2r - 2
-2r -2r
2r = -2
/2 /2
r = -1
hope this helps
the discriminant of a quadratic equation is the value b2 – 4ac. what is the value of the discriminant of 0
Cannot determine the nature of roots.
The Nature of roots simply means the category in which the roots are falling upon. The roots may be imaginary, real, unequal or equal. If the discriminate is negative, the roots will be imaginary.
The nature of roots of quadratic equations (in the form ax^2 + bx +c=0) we need to calculate the discriminant, which is b^2 - 4 a c. When discriminant is greater than zero, the roots are unequal and real. When discriminant is equal to zero, the roots are equal and real.
The Discriminant of a polynomial is a quantity that depends on the coefficients and allows deducing some properties of the roots without computing them. More precisely, it is a polynomial function of the coefficients of the original polynomial.
Given that ,
b2 – 4ac
first we arrange terms in descending order -4ac + 2b
then find discriminant of quadratic equation :Δ = 4
Identify a, b, c through co-efficient:
a = 0
b= -4c
c = 2b
Substitute the value of a, b, c and calculate discriminant
([tex]b^{2} -[/tex] 4ac)
Δ = [tex]16c^{2}[/tex] determine number of solutions with discriminant:
Can't determine the nature of roots.
Learn more about discriminant here: brainly.com/question/12383696
SPJ4
helpppppppppppppppppppppppppp
The answer is: 8m=152
Consider the system y=ax+b and y=cx+d. State the conditions on the constants a, b, c, and d for which the system below has...
A. Exactly 1 solution.
B. No solutions
C. Infinitely
The following cases for the solutions of a system of linear equations are listed below:
The system has infinite solutions when a = k · c and b = k · d. The system of linear equations has no solutions for a = c. The system has only one solution if and only if a ≠ k · c and b ≠ k · d.How to infer the nature of the dependent constants in a system of linear equations
In this problem we find the case of a system of linear equations with two variables, of which we must determine the nature of its dependent constants for the following three cases:
The system has one solution.The system has no solutions.The system has infinite solutions.The implicit form of this system is shown below:
a · x - y = - b (1)
c · x - y = - d (2)
According to the linear algebra, a system of linear equations has no solutions if the determinant of the matrix of dependent coefficients is equal to zero. Then, by Cramer's law we find that:
a - c = 0
a = c
Therefore, the system of linear equations has no solutions for a = c.
Also by linear algebra, we know that the two linear equations have infinite solutions if and only if both equations are multiples of each other, then:
a · x - y + b = k · (c · x - y + d)
a · x - y + b = (k · c) · x - k · y + (k · d)
The system has infinite solutions when a = k · c and b = k · d.
Then, the system has only one solution if and only if a ≠ k · c and b ≠ k · d.
To learn more on systems of linear equations: https://brainly.com/question/19549098
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Help ill give brainlist
how many lines of symmetry does this have? 5?
Answer:
3
Step-by-step explanation:
I think ttttttttttttttttttttt
A 20 foot ladder is leaning up against the side of a house. The construction worker who put it there followed the directions on the ladder's specifications which said to make sure the ladder was at least 8 feet away from the base of the wall to ensure safety. Say we want to re-word the directions and specify the angle of elevation of the ladder instead. What could the directions say about the angle of elevation?
Answer:
Keep the ladder at a 66 degree angle of elevation at most.
Step-by-step explanation:
Hypotenuse is 20 feet
Adjacent side is 8 feet
We use inverse cosine to find the angle
arccos(8/20) = 66.4 deg
2y + 7x = -5
5y - 7x = 12
x =
y =
Answer:
x = - 1, y = 1
Step-by-step explanation:
Given the 2 equations
2y + 7x = - 5 → (1)
5y - 7x = 12 → (2)
Adding the2 equations term by term will eliminate the term in x, that is
7y = 7 ( divide both sides by 7 )
y = 1
Substitute y = 1 into either of the 2 equationsand solve for x
Substituting into (1)
2(1) + 7x = - 5
2 + 7x = - 5 ( subtract 2 from both sides )
7x = - 7 ( divide both sides by 7 )
x = - 1
solution is x = - 1, y = 1
Which of the following inequalities matches the graph?
graph of an inequality with a solid vertical line through the point (negative 7, 0) and shading to the left of the line
Answer:
d
Step-by-step explanation:
5 =5v^+^
Which of the following shows the length of the third side, in inches, of the triangle below? (1 point)
A right triangle is shown. One side of the triangle is labeled as 25 inches. The height of the triangle is labeled as 15 inches.
20 inches
Square root of 850 inches
Square root of 10 inches
40 inches
Answer:
20
Step-by-step explanation:
Find two integers whose sum is -8 and product is -48
-12 * 4= 48 and -12+4= -8
(b) Factorise fully 2 a²b + 6ab2
Answer:
2ab(a+3b)Step-by-step explanation:
[tex]2 {a}^{2} b + 6a {b}^{2} [/tex]
Factor out common term : 2ab
[tex] 2 {a}^{2}b \div 2a = a \\ 6a {b}^{2} \div 2ab = 3b \\ 2ab(a + 3b)[/tex]
[tex]2a^2b+6ab^2[/tex]
Perhaps, you mean 6ab² (If not please remind me.)
Factoring the polynomials can be done by pulling out the terms that can be divided by that terms.
For example, [tex]2x^2+4[/tex] We can divide the whole polynomial by 2. Thus, we factor 2 out of the polynomial as we get [tex]2(x^2+2)[/tex] -- Factoring is like dividing, but instead - we pull them out.
Now let's get back to the question.
Notice that the polynomial can be divided by 2, a and b.
So we pull 2, a and b out of the polynomial and divide them.
[tex]\frac{2a^2b+6ab^2}{2ab}\\a+3b[/tex]
When dividing, we should get a + 3b.
Then we pull out 2ab outside the bracket.
[tex]2ab(a+3b)[/tex]
Thus, the answer is 2ab(a+3b)
Which inequality is shown in the graph?