Question

Due to convection

Hello! How can I assist you today?

Of course! Please go ahead and ask your question. I'll do my best to help you.

Certainly! Let's start by applying the properties of integer exponents to rewrite 2^(2/2) ÷ 2^(-4) with only positive exponents.

First, let's simplify 2^(2/2). The exponent 2/2 simplifies to 1, so we have 2^1.

Next, let's apply the exponent rule for division, which states that a^m ÷ a^n = a^(m-n). In this case, we have 2^1 ÷ 2^(-4).

Applying the exponent rule, we subtract the exponents: 1 - (-4) = 1 + 4 = 5.

So, 2^(2/2) ÷ 2^(-4) becomes 2^5.

Now, let's solve the expression 2^5 to a whole number:

2^5 = 2 × 2 × 2 × 2 × 2 = 32.

Therefore, the solution to the expression 2^(2/2) ÷ 2^(-4), with only positive exponents, is 32.

I hope this helps! Let me know if you have any further questions.

Sure! Let's apply the properties of integer exponents to simplify the expression and rewrite it with only positive exponents.

First, let's simplify 4^0. Any number (except zero) raised to the power of 0 is equal to 1. So, 4^0 = 1.

Next, let's simplify 5^(-2). The negative exponent indicates that we take the reciprocal of the base raised to the positive exponent. So, 5^(-2) = 1/(5^2) = 1/25.

Now, let's simplify (-2)^(-3). Similar to the previous step, the negative exponent indicates that we take the reciprocal of the base raised to the positive exponent. So, (-2)^(-3) = 1/((-2)^3) = 1/(-8) = -1/8.

Now we can rewrite the expression: 4^0 ⋅ 5^(-2)/((-2)^(-3))

Using the properties of exponents for multiplication and division, we have:

4^0 ⋅ (1/25)/(-1/8)

Since any number (except zero) raised to 0 is 1, we can simplify further:

1 ⋅ (1/25)/(-1/8)

Multiplying by the reciprocal of a fraction is equivalent to dividing, so we can rewrite:

(1/25) ÷ (-1/8)

Dividing by a fraction is the same as multiplying by its reciprocal, so we can rewrite:

(1/25) × (-8/1)

Now, multiplying fractions is simply multiplying the numerators and denominators:

1 × (-8) = -8
25 × 1 = 25

Therefore, the simplified fraction with no remaining exponents is -8/25.

So, the solution to the expression 4^0 ⋅ 5^(-2)/((-2)^(-3)), with only positive exponents, is -8/25.

I hope this clarifies the solution for you! Let me know if you have any further questions.

I apologize for any confusion. Let's go through the steps again to ensure accuracy.

We start with the expression 4^0 ⋅ 5^(-2)/((-2)^(-3)).

First, 4^0 is always equal to 1.

Then, we simplify 5^(-2). The negative exponent tells us to take the reciprocal of the base raised to the positive exponent. So, 5^(-2) is equal to 1/(5^2), which simplifies to 1/25.

Next, we simplify (-2)^(-3). Again, the negative exponent means we take the reciprocal of the base raised to the positive exponent. So, (-2)^(-3) is equal to 1/((-2)^3), which simplifies to 1/(-8) or -1/8.

Now, let's rewrite the expression with the previously simplified values: 1 ⋅ (1/25)/(-1/8).

To divide by a fraction, we can multiply by its reciprocal, so we have (1 ⋅ 8)/(25 ⋅ (-1)).

This simplifies to 8/(-25).

To simplify this fraction further, we can multiply both the numerator and denominator by -1 to ensure the denominator is positive. Doing so gives us -8/25.

Therefore, the simplified fraction with no remaining exponents is indeed -8/25.

I apologize for any confusion earlier. The correct solution to the expression 4^0 ⋅ 5^(-2)/((-2)^(-3)), with only positive exponents, is -8/25.

If you have any further questions or concerns, please let me know.

Certainly! Let's apply the properties of integer exponents to simplify the expression and rewrite it with only positive exponents.

The given expression is (14^3 ⋅ 27^(-7))^0/34.

To simplify the expression, let's start by considering the exponent of zero. Any non-zero number raised to the power of zero is equal to 1. Therefore, we can simplify (14^3 ⋅ 27^(-7))^0 to 1.

Now, we have 1/34 left in the expression.

So, the simplified expression is 1/34.

Therefore, the solution to the given expression, with only positive exponents, is 1/34.

If you have any more questions, feel free to ask!

Apologies for the incorrect response. Let's go through the steps again to ensure accuracy.

The given expression is (14^3 ⋅ 27^(-7))^0/34.

First, let's simplify the expression inside the parentheses.

14^3 can be evaluated as 14 * 14 * 14, which equals 2744.

27^(-7) is equivalent to 1/(27^7).

Now, the expression becomes (2744 ⋅ 1/(27^7))^0/34.

Next, let's simplify the expression inside the parentheses.

2744 ⋅ 1/(27^7) can be rewritten as 2744/27^7.

Now, we have (2744/27^7)^0/34.

The exponent of zero indicates that any non-zero number raised to the power of zero is equal to 1. Therefore, (2744/27^7)^0 becomes 1.

Now, we have 1/34 left in the expression.

Therefore, the simplified expression is 1/34.

To summarize, the solution to the given expression, with only positive exponents, is indeed 1/34.

I apologize for any confusion caused by the earlier response. If you have any further questions, please let me know.