True or false math problem?

Is the following statement always, sometimes, or never true? Explain your choice.

A number raised to a negative exponent is negative.

Update:

Understood: For example, 9^-7 would be 1/9^7, which would be 1/4782969, which is positive.

Comments

  • NO!

    Take a look at these examples.

    1. 2^-2 = 1/2^2 = 1/4

    2. 4^-4 = 1/4^4 = 1/256

  • A number raised to a negative exponent is negative.

    False

    Because, a number raised to a negative exponent is always a fraction:

    Example 3^-1 = 1/3

    (4/5)^-1 = 5/4

    Hope this helps. Let me know if you need more assistance. I'm on Messenger or by email.

    Best of luck.

  • If the number is a positive number, such as, 4, then 4^(-1) = 0.25

    If the number is a negative number such as, -4, then (-4)^(-1) = -025

    So the statement is "sometimes" true.

  • If the base is positive and the exponent is negative then the answer will be positive if the the base is negative and the exponent it negative then the answer will be negative so sometimes

  • Case 1:  (pos N)^(neg M) = positive #  ... where N and M are any real numbers

     Example: (+3.4)^(-2.7) = +0.0367  ... positive result  ◀◀

    ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~

    Case 2:  (neg N)^(neg M)     =     1 ⁄ [ (neg N)^(pos M) ]  ... where N and M are integers

                   if M is EVEN, then:  (neg N)^(neg even M) = positive result  ◀◀

                     Example: (-3)^(-4) = +0.0123

                   if M is ODD, then:  (neg N)^(neg odd M) = negative result  ◀◀

                     Example: (-3)^(-3) = -0.03781

    For fractional M values, the result is a complex (imaginary) value.

         Example: (-3)^(-2.3)     =     0.047 – 0.06465 i   ... complex number result  ◀◀

    ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~ ~

    Also, FYI ...

               (posN)^(0) = 1

               (neg N)^(0) = 1

         Answer: SOMETIMES  ◀◀

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