I've had a look at this and found 2 conceivable answers to the problem.

For practical purposes, I shall only submit one of them ----> R? = 15 Ohms

Does that tally with your solution?

If R? = 15Ω then the 5Ω resistor is going to be dissipating 11.25 Watts. Maybe it would be better to use the other possibility of 5/3 (=1.667) Ohms for R because then the 5Ω resistor only dissipates 1.25 Watts. :-)

// There are 2 answers after all!! //

Let the current through R? be i1 and that passing through the 5 Ω be i2. Then the sum of i1 and i2 equals 2Amps -----> i1 + i2 = 2

Let the voltage across parallel resistor network be V, so that V = 5.i2

Since P = VI then 3.75 = 5.i2.i1

Substituting i1 for 2 - i2 we can write equation as;

3.75 = 5.i2 (2 - i2)

Expanding parenthesis and rearranging gives;

5.i2² - 10.i2 + 3.75 = 0

The expression above is in the form of a Quadratic equation with roots equating to two values for i2, namely 1.5 and 0.5 Amps.

I will leave that bit upto the HND student to verify.

// If R? = 15Ω then the 5Ω resistor is going to be dissipating 11.25 Watts. //

In terms of achieving minimum power consumption this cannot be disputed. In that sense I totally agree :0)

The value R? = 15 Ω was offered as a pragmatic solution based upon the number 1.5 (coincidentally this happens to be one of the branch current values) and its associated exponents to the powers of 10. These are a preferred resistor value and readily bought off the shelf.

Whereas you will appreciate a 1.667 Ω resistor would be quite difficult to source :-/