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2 years ago

G(x)=x-2 h(x) = 3x - 4 Find (g+hXG)

Mathematics

1 answer:

julsineya [31]2 years ago

4 0

Answer:

−

Step-by-step explanation:

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Please help!!<br> Everything is in the photo

Nutka1998 [239]

A) Pine Road and Oak Street form a right angle, so we can extract the relation

$\tan30^\circ=\dfrac x{11\sqrt3}\implies\dfrac1{\sqrt3}=\dfrac x{11\sqrt3}\implies x=11$

where $x$ is the distance we want to find (bottom side of the rectangle).

Alternatively, we can use the other given angle by solving for $x$ in

$\tan60^\circ=\dfrac{11\sqrt3}x$

but we'll find the same solution either way.

b) Pine Road and Oak Street form a right triangle, with Main Street as its hypotenuse. We can use the Pythagorean theorem to find how long it is.

$(\text{Pine})^2+(\text{Oak})^2=(\text{Main})^2$

Let $y$ be the length of Main Street. Then

$(11\sqrt3)^2+11^2=x^2\implies x^2=484\implies x=\pm22$

but of course the distance has to be positive, so $x=22$ .

8 0

3 years ago

The equation represents an ellipse. which points are the vertices of the ellipse? (7, 1) and (7, −5) (7, −10) and (7, 6) (10, −2

OleMash [197]

The points which represents the vertices of the given equation are; (15, −2) and (−1, −2).

<h3>Which points among the answer choices represents the vertices of the ellipse whose equation is given?</h3>

The complete question gives the equation of the ellipse as; (x-7)²/64+(y+2)²/9=1.

Since, It follows from convention that general equation of ellipse with centre as (h, k) takes the form;

(x-h)²/a² +(y-k)²/b² = 1.

Consequently, it follows from observation that the value of a and b in the given equation in the task content is; √64 = 8 and √9 = 3 respectively.

Since, 8 > 3, The vertices of the ellipse are given by; (h±a, k).

The vertices in this scenario are therefore;

(7+8, -2) and (7-8, -2).

= (15, -2) and (-1, -2).

Read more on vertices of an ellipse;

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7 0

1 year ago

What is the value of x? Enter your answer in the box

g100num [7]

x = 180° - 67° - 52°

x = 61°

So, the value of x is 61°

5 0

3 years ago

Please help this is for my maths midterm and i have no idea how to solve

slava [35]

Step-by-step explanation:

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3 years ago

find the number of positive integers not exceeding 100 that are either odd or the square of an integer.

Ivenika [448]

Answer:

Step-by-step explanation:

50 odd numbers and 3 even square numbers

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1 year ago