Answer:
Du lịch quốc tế là những chuyến du lịch mà nơi cư trú của khách du lịch và nơi đến du lịch thuộc hai quốc gia khác nhau. ... + Du lịch ra nước ngoài (du lịch quốc tế gửi khách - Outbound Tourism): Là chuyến đi của một cư dân trong một nước đến một nước khác và tiêu tiền kiếm được ở đất nước của mình tại nước đó.
Explanation:
All of the aforementioned are implied by Viagra advertisements except that: women should be more se-xually assertive.
<h3>What is an advertisement?</h3>
An advertisement can be defined as consumer promotions programs that are designed and developed with the sole intention of making the various goods (products) or services which are being offered by a business firm to become known, popular and familiar to all of its customers and potential customers.
In this scenario, we can infer and logically that Viagra advertisements which depicts it as being an aphrodisiac and se-xual enhancer doesn't imply that women should be more se-xually assertive over their male counterparts (partners).
Read more on advertisements here: brainly.com/question/10196860
#SPJ1
It's The Heart. Hope This Helps
Answer:
34
Explanation:
1+1+34+34 = 2+68=70
if we consider only whole numbers the longest side could be 34
The dimensions of the smaller holding pens from the parameters given are; 96 ft and 31 ft
<h3>What dimensions will maximize the area?</h3>
From the complete question, if the side lengths of the big rectangle are x and y, then the expression for the area A is:
A = x*y
Then perimeter since we have 384 ft of fencing available is;
2x + 2y = 384
y = (384 - 2x)/2
y = 192 - x
Put 192 - x for y in area formula;
A = x(192 - x)
A = 192x - x²
Completing the square of this are equation gives;
A = 9216 - (x - 96)²
This means that A is maximum at x - 96 = 0
Thus, A is maximum when x = 96 ft
At A_max; y = 192 - 96 = 96 ft
Since the area of the bigger rectangle has been maximized, it means that we have also maximized the area of the smaller pens. Therefore its' dimensions will be;
x_small = 96 ft/3 = 31 ft
y_small = 96 ft
Read more about maximizing area at; brainly.com/question/9819619
