Answer:
elephant: 566.5 kilograms, Bengal tiger: 224.4kilograms, lion: 193.8 kilograms, , giraffe: 164.8 kilograms, giant panda: 122.4 kilograms
Step-by-step explanation:
elephant: 566.5 kilograms, giraffe: 164.8 kilograms, lion: 193.8 kilograms, Bengal tiger: 224.4kilograms, giant panda: 122.4 kilograms
<span>the main formula of the lateral area of the rectangular prism is given by Area lateral = perimeter of base x height, in our cas height is 15 inches, length is 5, and width 4. the perimeter of base = (4+5)x2=18, and then the Area lateral =18 x 15 = 270, so the true answer is B=270.</span>
Relations are subsets of products A×BA×B where AA is the domain and BB the codomain of the relation.
<span>A function <span>ff</span> is a relation with a special property: for each <span><span>a∈A</span><span>a∈A</span></span> there is a unique <span><span>b∈B</span><span>b∈B</span></span> s.t. <span><span>⟨a,b⟩∈f</span><span>⟨a,b⟩∈f</span></span>.This unique <span>bb</span> is denoted as <span><span>f(a)</span><span>f(a)</span></span> and the 'range' of function <span>ff</span> is the set <span><span>{f(a)∣a∈A}⊆B</span><span>{f(a)∣a∈A}⊆B</span></span>.You could also use the notation <span><span>{b∈B∣∃a∈A<span>[<span>⟨a,b⟩∈f</span>]</span>}</span><span>{b∈B∣∃a∈A<span>[<span>⟨a,b⟩∈f</span>]</span>}</span></span>Applying that on a relation <span>RR</span> it becomes <span><span>{b∈B∣∃a∈A<span>[<span>⟨a,b⟩∈R</span>]</span>}</span><span>{b∈B∣∃a∈A<span>[<span>⟨a,b⟩∈R</span>]</span>}</span></span>That set can be labeled as the range of relation <span>RR</span>.</span>
Like what you mean I can answer any questions
Answer:
C. 24.27 cm
Step-by-step explanation:
sin 65° = opposite ÷ hypotenuse
sin 65° = 22/x
multiply both sides of the equation by x
(sin 65°)x = 22
divide both sides of the equation by sin 65°
x = 22 ÷ sin 65°
punch in 65 sin into your calculator
x = 22 ÷ 0.90631
x = 24.27 cm