MATHEMATICS HIGH SCHOOL

Which unit would you use to measure the weight of a cell phone?ounces
pounds
tons
pints

Answers

Answer 1
Answer: The answer should be ounces.

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Find the area of a sector with a central angle of 110° and a diameter of 6 cm. Round to the nearest tenth.

Answers

=1/2* r^2 * theta
r=D/2=3 cm
theta=110 deg= 1.92 radian.
area=1/2*3*3*1.92 cm2 =8.64 cm2
=8.6 cm2 (approx.)

Which one of the following is NOT equal to the others?30%

0.3

3/10

0.03

Answers

Answer:

.03

Step-by-step explanation:

.03 would be 3% where all the others are 30% hope this helped!

Answer:

0.03

Step-by-step explanation:

30%, 3/10, and 0.3 are all equal to 30. 0.03 is equal to 3.

how do I figure out the weight loss of tina? she lost 3 pounds on the first week of her diet. she gained a pound on the second week, and then lost 2 pounds a week during every week afterwards. she has been dieting for a total of 13 weeks. how many pounds has tina lost in all?

Answers

1st week - Lost 3 pounds = +3 
2nd week - Gained 1 pound = -1    
3+13 = + 22       

So 22+3 = 25                 25-1 = 24 

So Tina lost 24 pounds in 13 weeks. 

What is the value of x in this triangle?A.0.58°
B.o 28.89°
C.o 56.51°
D.o 33.49°

Answers

The value of x is 33.49°.

What is a right triangle?

A triangle with one of its angles measuring 90° is known as a right triangle.

Given a right triangle with a hypotenuse of length 58 and a leg of length 32.

Use the sine rule:

(sin90°) / 58 = (sinx) / 32

sinx = 32/58

x = sin⁻¹ ( 32/58)

x = 33.49°

Hence, the value of x is 33.49°.

Learn more about right triangles here:

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Answer:

D. 33.49

Step-by-step explanation:

Point G is located at (3, −1) and point H is located at (−2, 3). Find y value for the point that is 2 over 3 the distance from point G to point H.

Answers

Answer: The answer is (5)/(3).

Step-by-step explanation:  Given that the co-ordinates of point G and H are (3, -1) and (-2, 3) respectively.

We are to find the y-value of the point P that is located at two-third distance from point G to point H.

As shown in the attached figure, the ration in which the point P divides the line segment GH is 2 : 1.

Therefore, the co-ordinates of point P will be

\left((2* (-2)+1* 3)/(2+1),(2* 3+1* (-1))/(2+1)\right)\n\n\n=\left((-4+3)/(3),(6-1)/(3)\right)\n\n=\left((-1)/(3),(5)/(3)\right).

Thus, the y-value of the point P is (5)/(3).
B. 1.67
m : n = 2 : 1
 ( x, y ) = ( (1*3 + 2*(-2))/(2+1) ;  (1 * (-1) + 2 * 3) /(2 + 1) ) =
 = ( (3-4)/3  ; (-1+6)/3 ) 1.67

Micah found the vertex for the function y= -9.5x? 47.5x+ 63 as shown. Find and correct Micah's error. Explain the error?

Answers

Answer:

See Explanation

Step-by-step explanation:

The question is incomplete as Micah's workings is not attached. So, there's no way to determine where Micah's error is.

However, I'll solve for the vertex of the given function.

Given

y = -9.5x^2 + 47.5x + 63

Vertex, V is of the form:

V= (h,k)

Where

h = -(b)/(2a)

and

k = f(h)

Solving for h:

y = -9.5x^2 + 47.5x + 63

y = ax^2 + bx + c

So:

a = -9.5

b = 47.5

c = 63

h = -(b)/(2a)

h = -(47.5)/(2 * -9.5)

h = -(47.5)/(-19)

h = (47.5)/(19)

h = 2.5

Solving for k

k = f(h)

k = f(2.5)

Substitute 2.5 for x in y = -9.5x^2 + 47.5x + 63

k = -9.5 * 2.5^2 + 47.5* 2.5 + 63

k = -59.375+ 118.75 + 63

k = 122.375

Hence:

The vertex is

V = (2.5,122.375)

The correct vertex for the function  y = -9.5x^2 + 47.5x + 63 is (2.5, 122.375).

The given function is y = -9.5x^2 + 47.5x + 63.

To find the vertex of a quadratic function in the form y = ax^2 + bx + c, we can use the formula x = -b / (2a) to find the x-coordinate of the vertex.

In this case, the coefficient of x^2 is -9.5, the coefficient of x is 47.5, and there is no constant term.

Using the formula, we can find the x-coordinate of the vertex:

x = (-b )/( 2a)\nx = (-47.5 )/( (2 * -9.5))\nx = 2.5

Now, substitute this x-coordinate back into the original function to find the y-coordinate:

y = -9.5(2.5)^2 + 47.5(2.5) + 63\ny = -9.5(6.25) + 118.75 + 63\ny = -59.375 + 118.75 + 63\ny = 122.375

Therefore, the correct vertex for the function  y = -9.5x^2 + 47.5x + 63 is (2.5, 122.375).

Micah's error might be related to incorrectly calculating the x-coordinate of the vertex or substituting the wrong value back into the function.

To know more about an expression follow;

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