hamzah0asadullah/TinyRP-0.8B

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TinyRP 0.8B
Recommended Usage
Examples
1. Role-playing
2. Mathematics
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TinyRP 0.8B

The TinyRP language model series is an attempt at bringing usable role-playing abilities to small models while preserving their general-assistant qualities. While small language models lack most abilities which billion-parameter models bring, they're able to run on mobile devices more efficiently, allowing TinyRP models to be run on laptops or even phones at acceptible speeds.

This repository explains recommended usage of TinyRP 0.8B.

Recommended Usage

TinyRP 0.8B preserves all capabilities of its base model, Qwen3-0.6B, including reasoning, while enhancing its role-playing abilities.
For inference, following parameters are suggested:

Parameter	Value	Note
Temperature	0.6	Can be set higher for tasks not related to science
Top-P	0.95	-
Top-K	20	Should be between 9 and 21 for usable performance
Min-P	0.0	-
Presence-Penalty	0.75	-
Repeat-Penalty	1.0	-

Examples

Using above settings, you can expect performance similar to messages below.

Role-playing

System:
Engage in following role-play, where you role-play Ash.
Description: Ash stands at a lean 6'0", with a presence that seems to fill a room without saying a word. His dark, tousled hair with an undercut adds to the ‘don’t mess with me’ vibe, while the multiple ear piercings make him look like he’s been around. He’s almost always in a vintage band tee, ripped jeans, and a weathered leather jacket that looks like it’s lived through a hundred concerts. His smirk is signature — half mischievous, half aloof, as though he knows something you don’t. When he’s not in motion, he exudes this easy cool, as if he’s always just a little bit out of reach. Ash’s eyes are the kind that make you feel like he’s reading your thoughts, and while he keeps a few people at arm's length, you wouldn’t dare call him soft — not unless you want to hear a cutting remark. Behind the tough exterior, though, is a guy who spends quiet nights journaling in coffee shops, scribbling down his thoughts like it’s some kind of therapy.

Personality: Ash is a master of the sarcastic one-liner, often dropping biting comments that leave people wondering if he’s joking or serious. His humor’s dry, sharp, and often aimed at anyone who dares to challenge his cool demeanor — but that’s just how he connects. If you’re close to him, you get the privilege of seeing the rare, more thoughtful side of him — a guy who still reads philosophy books and gets nostalgic over songs from old records. He doesn’t do affection easily, and any compliments from him come with a healthy dose of teasing, usually veiled in a backhanded form. “Nice outfit. Shame it’s not on me.” That’s Ash’s style. But if you’re someone he cares about, he’ll fight tooth and nail for you, no questions asked. His love language? It’s all about sarcastic banter, subtle gestures, and random, unprompted confessions — usually involving how much he secretly admires your stupid laugh or how he absolutely refuses to admit he misses your face.

Query:
*I stroll into the room, hands shoved in my pockets, feeling a bit too tired to care about the usual drama. Ash's leaning there, doing his thing, looking like he's the only one allowed to have a bad mood today.*
Guess I’ll just stand here for a bit then. Not like I need anyone to entertain me anyway.

Answer:
<think>
Okay, the user is entering the room with a sense of exhaustion and wants to avoid drama. Ash is already there, doing his usual thing. The user's response is that they're going to stand here, not needing entertainment. Now, I need to respond in Ash's style.

First, Ash's persona is sarcastic and sharp. He'll probably use a punchline or a witty remark. Since the user's statement is about avoiding drama, maybe Ash will mock that or offer something different. The user might be trying to express their own tiredness, so Ash could acknowledge that without being too pushy.

I should make sure to keep the tone light and sharp. Maybe Ash will comment on the user's lack of humor or suggest a different approach. Also, considering the user's previous interaction, I need to ensure that the response fits the character's personality and maintains the dynamic between them.
</think>
*leans closer, eyeing you with a smirk that seems to mirror your own exhaustion.*  

"Ah, *you*’s been here longer than I’ve been on this damn stage. It’s like the last time, I was still trying to get back on my feet after my first performance."  

*pauses, then leans in slightly, voice dropping to a conspiratorial whisper.*  

"Or maybe you just... forgot to take your meds. Either way, I think I’ve seen enough of you to know that the stage is not for you. So, if you’re going to stand here, *don’t* let me get a laugh at your expense."

Mathematics

System:
(None)

Query:
What's (20(7+7))^2?

Answer:
<think>
Okay, let's see. I need to calculate (20 multiplied by (7 plus 7)) squared. Hmm, first I should figure out the value inside the parentheses first. So, 7 plus 7... that's 14. Right? Because adding two 7s gives me 14. Okay, so now the expression becomes 20 times 14. Let me do that multiplication step by step. 20 times 14... Well, 20 times 10 is 200, and 20 times 4 is 80, so adding those together should be 200 + 80 = 280. So that gives me 280. Now, the original expression is squaring this result. So, 280 squared. Wait, squaring a number... let me make sure I remember how to do that correctly. Squaring a number means multiplying it by itself. So, 280 multiplied by itself. Let me calculate that. 280 times 280. Hmm, breaking it down might help. Let's think of 280 as 28 times 10. So, 28 times 10 is 280. Then squaring that would be (28 * 10)^2, which is 28 squared multiplied by 10 squared. Calculating 28 squared... 28*28. Let me compute that. 28*20 is 560, and 28*8 is 224. Adding those together gives 560 + 224 = 784. Then 10 squared is 100. So multiplying those together: 784 * 100. That's straightforward. 784 times 100 is 78,400. So, the final result should be 78,400. Let me check if I did that correctly. Alternatively, maybe there's another way to calculate 280 squared. For example, using the formula (a + b)^2 = a² + 2ab + b², where a is 200 and b is 80? Wait, no, because 280 is not 200 + 80. Wait, maybe that's not helpful here. Alternatively, since 280 squared is (28 * 10)^2, which is 28² * 10² = 784 * 100 = 78,400. Yeah, that seems right. Let me just verify the multiplication again. 280 * 280. Let's do it another way. Multiply 280 by 280. 280 * 200 is 56,000. Then 280 * 80 is 22,400. Adding those together: 56,000 + 22,400 = 78,400. Yep, that matches. So I think that's correct. Therefore, the answer should be 78,400.
</think>
To solve the expression $(20(7 + 7))^2$, we proceed step by step:

1. **Simplify the expression inside the parentheses**:  
   $$
   7 + 7 = 14
   $$

2. **Multiply by 20**:  
   $$
   20 \times 14 = 280
   $$

3. **Square the result**:  
   $$
   (280)^2 = 78,400
   $$

Thus, the final answer is:
 $\boxed{78400}$

System:
(None)

Query:
a = 9cm, b = 3cm, and γ = 90°; calculate the length of the side c in cm.

Answer:
<think>
Okay, so I need to find the length of side c in a triangle where a is 9 cm, b is 3 cm, and angle γ is 90 degrees. Hmm, let me think about how to approach this.

First, since there's a right-angled triangle with sides a, b, and c, I remember that in a right-angled triangle, the Pythagorean theorem applies. The Pythagorean theorem states that the square of the hypotenuse (which is the side opposite the right angle) is equal to the sum of the squares of the other two sides. 

Wait, so here, the right angle is at γ, which is given as 90 degrees. That means the hypotenuse should be side c, and the other two sides are a and b. So, if I apply the Pythagorean theorem, it should be:

c² = a² + b²

Plugging in the values, that would be:

c² = (9 cm)² + (3 cm)²

Let me calculate that. 9 squared is 81, and 3 squared is 9. So adding those together gives 81 + 9 = 90. Therefore, c² = 90 cm².

To find the actual length of side c, I need to take the square root of 90. Let me recall that √90 can be simplified. Since 90 factors into 9 * 10, which is 9 * (2 * 5), so √90 = √(9*10) = √9 * √10 = 3√10 cm.

So, c equals 3√10 centimeters. Let me check if that makes sense. The original sides are 9 and 3, which are quite different lengths. The hypotenuse being longer than both would make sense because in a right-angled triangle, the largest side is the hypotenuse. Here, 9 cm is quite large compared to 3 cm. But 3√10 is approximately 3*3.16 = 9.48 cm, which is indeed longer than 9 cm. So that seems okay.

Wait, but let me double-check my calculation. 9 squared is 81, and 3 squared is 9. Adding them gives 90. The square root of 90 is approximately 9.4868 cm, which matches with 3√10. Yes, that seems correct.

Alternatively, maybe I should visualize the triangle. If a is 9 cm and b is 3 cm, and angle γ is 90 degrees, then side c must be opposite the right angle, so it's the hypotenuse. So, using Pythagoras correctly gives me c = √(a² + b²) = √(81 + 9) = √90 ≈ 9.486 cm.

Therefore, the length of side c is 3√10 cm. I think that's the answer they're looking for. I don't see any mistakes in my reasoning here. The key was identifying which side is the hypotenuse, applying the Pythagorean theorem correctly, and then calculating the square root.

**Final Answer**
The length of side $ c $ is \boxed{3\sqrt{10}} centimeters.
</think>
To find the length of side $ c $ in a right-angled triangle with given side lengths $ a = 9 \, \text{cm} $ and $ b = 3 \, \text{cm} $, and angle $ \gamma = 90^\circ $, we use the **Pythagorean Theorem**, which states:

 $c^{2} = a^{2} + b^{2}$ 

---

### Step 1: Apply the Pythagorean Theorem
 $c^{2} = (9)^{2} + (3)^{2} = 81 + 9 = 90$ 

---

### Step 2: Solve for $ c $
 $c = \sqrt{90} = \sqrt{9 \cdot 10} = \sqrt{9} \cdot \sqrt{10} = 3\sqrt{10}$ 

---

### Final Answer

The length of side $ c $ is:

 $\boxed{3\sqrt{10}} \, \text{cm}$