Question 1: [8 marks]: If f∘g is one-to-one does it follow that g is one-to-one? Either...

. Let f and g : [0, 1] → R be continuous, and assume f(x) =...

. Let f and g : [0, 1] → R be continuous, and assume f(x) = g(x) for all x < 1. Does this imply that f(1) = g(1)? Provide a proof or a counterexample.

Provide at least one effective strategy that you either already follow or are planning to follow....

Provide at least one effective strategy that you either already follow or are planning to follow. Explain the strategy as well as your plan to follow it. Answer this question: How I and others can tell that I am communicating as a leader? You may consider answering the following supplementary questions if you find it useful: What kind of a leader am I? What are my leadership objectives? How do I take advantage of my strong points and minimize my...

In this question, we are going to call a function, f : R → R, type...

In this question, we are going to call a function, f : R → R, type A, if ∀x ∈ R, ∃y ∈ R such that y ≥ x and |f(y)| ≥ 1. We also say that a function, g, is type B if ∃x ∈ R such that ∀y ∈ R, if y ≥ x, then |f(y)| ≥1 Prove or find a counterexample for the following statements. (a) If a function is type A, then it is type B....

For Problems #5 – #9, you willl either be asked to prove a statement or disprove...

For Problems #5 – #9, you willl either be asked to prove a statement or disprove a statement, or decide if a statement is true or false, then prove or disprove the statement. Prove statements using only the definitions. DO NOT use any set identities or any prior results whatsoever. Disprove false statements by giving counterexample and explaining precisely why your counterexample disproves the claim. ********************************************************************************************************* (5) (12pts) Consider the < relation defined on R as usual, where x <...

Let f : A → B, g : B → C be such that g ◦...

Let f : A → B, g : B → C be such that g ◦ f is one-to-one (1 : 1). (a) Prove that f must also be one-to-one (1 : 1). (b) Consider the statement ‘g must also be one-to-one’. If it is true, prove it. If it is not, give a counter example.

Question One (4 marks) Consider the classical simple linear regression model: ?? = ?0 + ?1??...

Question One Consider the classical simple linear regression model: ?? = ?0 + ?1?? + ??, ?? ~ ?. ?. ?. (0, ?2) (a) Provide, with details, the appropriate expressions for ?(??) & ???(??). Assume that ?(??) = ??, ???(??) = ?^2? & ???(??, ??) = 0; i.e., that ?? & ?? are uncorrelated. 2.5 marks (b) Suppose now that the explanatory variable ?? is correlated with ?? such that ???(??, ??) = ???. Under this scenario, derive ?(??) &...

(f. 53v) A merchant has 40 marks of silver alloy [one mark is 8 ounces] with...

(f. 53v) A merchant has 40 marks of silver alloy [one mark is 8 ounces] with 6 and 1/2 ounces per of pure silver per mark. And he has 56 marks of another alloy, with 5 ounces of pure silver per mark. And he wants to make all of this into coinage which will contain 4 and 1/2 ounces of pure silver per mark. I ask how much coinage he will produce and how much copper he will have to...

Find f o g and g o f f(x)= 8/(x^2-1) , g(x) = x^3 +1 also...

Find f o g and g o f f(x)= 8/(x^2-1) , g(x) = x^3 +1 also find domain of f, g, f o g , and g o f

Let f(x)=3x4+8 and g(x)=x+4. (f∘g)(x)= Let f(x)=9x+9 and g(x)=5−7x2. (f∘g)(−2)=(f∘g)(−2)= Let h(x)=(f∘g)(x)=1/(x+8)^3. Find f(x) given g(x)=x+8....

Let f(x)=3x4+8 and g(x)=x+4. (f∘g)(x)= Let f(x)=9x+9 and g(x)=5−7x2. (f∘g)(−2)=(f∘g)(−2)= Let h(x)=(f∘g)(x)=1/(x+8)^3. Find f(x) given g(x)=x+8. f(x)=

Let V={f∈C1([−1,1])|f(1) =f(−1)}, then〈f, g〉=∫(f g+f'g′)dx (from -1 to 1) is an inner product on V...

Let V={f∈C1([−1,1])|f(1) =f(−1)}, then〈f, g〉=∫(f g+f'g′)dx (from -1 to 1) is an inner product on V (you do not have to verify this). Under this inner product, prove that: {x2}⊥={f∈V | ∫(x^2−2)f(x)dx= 0} (from -1 to 1)