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3 years ago

Simplify -10y-4y+x+2x+10-5

Mathematics

1 answer:

algol [13]3 years ago

4 0

Answer:

-14y + 3x + 5

Step-by-step explanation:

Using the concept of liketerms, let's break this equation into 3 parts.

-10y - 4y = -14y

x + 2x = 3x

10 - 5 = 5

Combine them back again.

-14y + 3x + 5

We cant go any further, because there are no like terms.

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3 years ago

Consider the equation below. f(x) = x^2/(x^2 + 2) (a) Find the interval on which f is increasing. (Enter your answer using inter

Kay [80]

Answer:

a) increasing (0, ∞); decreasing (-∞, 0)

b) min: (0, 0); max: DNE

c) inflection points: (-√6/3, 1/4), (√6/3, 1/4);

up: (-√6/3, √6/3); down: (-∞, -√6/3) ∪ (√6/3, ∞)

Step-by-step explanation:

The intervals of increase or decrease can be found from the sign of the slope, that is, the sign of the first derivative. That derivative is ...

f'(x) = ((x^2 +2)(2x) -x^2)(2x)/(x^2 +2)^2

f'(x) = 4x/(x^2 +2)^2

(a) f'(x) is positive for x > 0, hence ...

the function is increasing on (0, ∞)

the function is decreasing on (-∞, 0)

(b) f'(x) is zero for x=0, a local minimum. f(0) = 0.

minimum: (0, 0)

maximum: DNE

(c) The second derivative is ...

f''(x) = ((x^2+2)^2·4 -(4x)(2)(x^2 +2)(2x))/(x^2 +2)^4

= (8 -12x^2)/(x^2 +2)^3

Inflection points are where the second derivative is zero, or ...

8 -12x^2 = 0

x^2 = 2/3

x = ±√(2/3) = ±(√6)/3

The values of f(x) there are x^2/(x^2 +2) = (2/3)/(2/3 +2) = (2/8) = 1/4

The points of inflection are (x, y) = (-√6/3, 1/4), (√6/3, 1/4).

The function is concave up between these inflection points

f(x) is concave up on the interval (-√6/3, √6/3)

f(x) is concave down on (-∞, -√6/3) ∪ (√6/3, ∞)

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3 years ago

What’s the correct answer for this?

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You’re answer would be $28,000

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3 years ago

Let C be the boundary of the region in the first quadrant bounded by the x-axis, a quarter-circle with radius 9, and the y-axis,

rewona [7]

Solution :

Along the edge $C_1$

The parametric equation for $C_1$ is given :

$x_1(t) = 9t , y_2(t) = 0 \ \ for \ \ 0 \leq t \leq 1$

Along edge $C_2$

The curve here is a quarter circle with the radius 9. Therefore, the parametric equation with the domain $0 \leq t \leq 1$ is then given by :

$x_2(t) = 9 \cos \left(\frac{\pi }{2}t\right)$

$y_2(t) = 9 \sin \left(\frac{\pi }{2}t\right)$

Along edge $C_3$

The parametric equation for $C_3$ is :

$x_1(t) = 0, \ \ \ y_2(t) = 9t \ \ \ for \ 0 \leq t \leq 1$

Now,

x = 9t, ⇒ dx = 9 dt

y = 0, ⇒ dy = 0

$\int_{C_{1}}y^2 x dx + x^2 y dy = \int_0^1 (0)(0)+(0)(0) = 0$

And

$x(t) = 9 \cos \left(\frac{\pi}{2}t\right) \Rightarrow dx = -\frac{7 \pi}{2} \sin \left(\frac{\pi}{2}t\right)$

$y(t) = 9 \sin \left(\frac{\pi}{2}t\right) \Rightarrow dy = -\frac{7 \pi}{2} \cos \left(\frac{\pi}{2}t\right)$

Then :

$\int_{C_1} y^2 x dx + x^2 y dy$

$=\int_0^1 \left[\left( 9 \sin \frac{\pi}{2}t\right)^2\left(9 \cos \frac{\pi}{2}t\right)\left(-\frac{7 \pi}{2} \sin \frac{\pi}{2}t dt\right) + \left( 9 \cos \frac{\pi}{2}t\right)^2\left(9 \sin \frac{\pi}{2}t\right)\left(\frac{7 \pi}{2} \cos \frac{\pi}{2}t dt\right) \right]$